I got the 2d array to print but with all zero's and the only random number comes up on the bottom right corner
How do I get the code to print random numbers in all the elements of the 2d array?
Here is my code:
public static void main(String[] args) {
int columns = 8;
int rows = 4;
int rLow = 2;
int rHigh = 9;
printRandos(columns, rows, rLow, rHigh);
}
public static void printRandos(int clmn, int rws, int rlow, int rhigh) {
Random rando = new Random();
int randoNum = rlow + rando.nextInt(rhigh);
int[][] randoArray = new int[rws][clmn];
for (int i = 0; i < rws; i++) {
for (int k = 0; k < clmn; k++) {
randoArray[rws - 1][clmn - 1] = randoNum;
System.out.print(randoArray[i][k] + " ");
}
System.out.print("\n");
}
}
for (int i = 0; i < rws; i++)
{
for (int k = 0; k < clmn; k++)
{
int randoNum = rlow + rando.nextInt(rhigh);
randoArray[i][k] = randoNum;
System.out.print(randoArray[i][k]+" ");
}
System.out.print("\n");
}
your mistake inside the inner for loop of the printRandos method. Firstly your random number is outside the loop so your array elements were receiving the same number all the time. Another mistake is that you are assigning the value to the same array element all the time i.e rws-1 and clmn-1 .
inside your inner loop replace it with this:
int randoNum = rlow + rando.nextInt(rhigh);
randoArray[i][k] = randoNum;
System.out.print(randoArray[i][k]+" ");
Your bug is in this line:
randoArray[rws-1][clmn-1] = randoNum;
This stores your random number into randoArray[rws-1][clmn-1] each time, which as you noticed, is the bottom right corner. rws is always 4, and clmn is always 8. So you store the same number there 32 times, which gives the same result as storing it only once.
In the following line you are correctly printing the number from the current array location:
System.out.print(randoArray[i][k]+" ");
An int array comes initialized with all zeroes, and since except for the last corner you have not filled anything into your array, 0 is printed.
Also if you want different random numbers in all the cells, you would need to call rando.nextInt() inside your innermost for loop.
Unless you need this 2-D array for some purpose (which doesn't show from the minimal example code that you have posted), you do not need it for printing a matrix of random numbers, i.e., you may just print the numbers form within your loop without putting them into the array first.
Finally if rhigh should be the highest possible random number in the array, you should use rando.nextInt(rhigh - rlow + 1). With rlow equal to 2 and rhigh equal to 9 this will give numbers in the range from 0 inclusive to 9 - 2 + 1 = 8 exclusive, which means that after adding to rlow = 2 you will get a number in the range from 2 to 10 exclusive, in other words, to 9 inclusive.
I am on purpose leaving to yourself to fix your code based on my comments. I believe your learning will benefit more from working it out yourself.
Your assign the array value outside the array length
int[][] randoArray = new int[rws][clmn];
randoArray[rws][clmn] = randoNum;
Here randoArray[rws] is out of bounds.
In this case, the MAX is only 5, so I could check the duplicates one by one, but how could I do this in a simpler way? For example, what if the MAX has a value of 20?
Thanks.
int MAX = 5;
for (i = 1 , i <= MAX; i++)
{
drawNum[1] = (int)(Math.random()*MAX)+1;
while (drawNum[2] == drawNum[1])
{
drawNum[2] = (int)(Math.random()*MAX)+1;
}
while ((drawNum[3] == drawNum[1]) || (drawNum[3] == drawNum[2]) )
{
drawNum[3] = (int)(Math.random()*MAX)+1;
}
while ((drawNum[4] == drawNum[1]) || (drawNum[4] == drawNum[2]) || (drawNum[4] == drawNum[3]) )
{
drawNum[4] = (int)(Math.random()*MAX)+1;
}
while ((drawNum[5] == drawNum[1]) ||
(drawNum[5] == drawNum[2]) ||
(drawNum[5] == drawNum[3]) ||
(drawNum[5] == drawNum[4]) )
{
drawNum[5] = (int)(Math.random()*MAX)+1;
}
}
The simplest way would be to create a list of the possible numbers (1..20 or whatever) and then shuffle them with Collections.shuffle. Then just take however many elements you want. This is great if your range is equal to the number of elements you need in the end (e.g. for shuffling a deck of cards).
That doesn't work so well if you want (say) 10 random elements in the range 1..10,000 - you'd end up doing a lot of work unnecessarily. At that point, it's probably better to keep a set of values you've generated so far, and just keep generating numbers in a loop until the next one isn't already present:
if (max < numbersNeeded)
{
throw new IllegalArgumentException("Can't ask for more numbers than are available");
}
Random rng = new Random(); // Ideally just create one instance globally
// Note: use LinkedHashSet to maintain insertion order
Set<Integer> generated = new LinkedHashSet<Integer>();
while (generated.size() < numbersNeeded)
{
Integer next = rng.nextInt(max) + 1;
// As we're adding to a set, this will automatically do a containment check
generated.add(next);
}
Be careful with the set choice though - I've very deliberately used LinkedHashSet as it maintains insertion order, which we care about here.
Yet another option is to always make progress, by reducing the range each time and compensating for existing values. So for example, suppose you wanted 3 values in the range 0..9. On the first iteration you'd generate any number in the range 0..9 - let's say you generate a 4.
On the second iteration you'd then generate a number in the range 0..8. If the generated number is less than 4, you'd keep it as is... otherwise you add one to it. That gets you a result range of 0..9 without 4. Suppose we get 7 that way.
On the third iteration you'd generate a number in the range 0..7. If the generated number is less than 4, you'd keep it as is. If it's 4 or 5, you'd add one. If it's 6 or 7, you'd add two. That way the result range is 0..9 without 4 or 6.
Here's how I'd do it
import java.util.ArrayList;
import java.util.Random;
public class Test {
public static void main(String[] args) {
int size = 20;
ArrayList<Integer> list = new ArrayList<Integer>(size);
for(int i = 1; i <= size; i++) {
list.add(i);
}
Random rand = new Random();
while(list.size() > 0) {
int index = rand.nextInt(list.size());
System.out.println("Selected: "+list.remove(index));
}
}
}
As the esteemed Mr Skeet has pointed out:
If n is the number of randomly selected numbers you wish to choose and N is the total sample space of numbers available for selection:
If n << N, you should just store the numbers that you have picked and check a list to see if the number selected is in it.
If n ~= N, you should probably use my method, by populating a list containing the entire sample space and then removing numbers from it as you select them.
//random numbers are 0,1,2,3
ArrayList<Integer> numbers = new ArrayList<Integer>();
Random randomGenerator = new Random();
while (numbers.size() < 4) {
int random = randomGenerator .nextInt(4);
if (!numbers.contains(random)) {
numbers.add(random);
}
}
This would be a lot simpler in java-8:
Stream.generate(new Random()::ints)
.flatMap(IntStream::boxed)
.distinct()
.limit(16) // whatever limit you might need
.toArray(Integer[]::new);
There is another way of doing "random" ordered numbers with LFSR, take a look at:
http://en.wikipedia.org/wiki/Linear_feedback_shift_register
with this technique you can achieve the ordered random number by index and making sure the values are not duplicated.
But these are not TRUE random numbers because the random generation is deterministic.
But depending your case you can use this technique reducing the amount of processing on random number generation when using shuffling.
Here a LFSR algorithm in java, (I took it somewhere I don't remeber):
public final class LFSR {
private static final int M = 15;
// hard-coded for 15-bits
private static final int[] TAPS = {14, 15};
private final boolean[] bits = new boolean[M + 1];
public LFSR() {
this((int)System.currentTimeMillis());
}
public LFSR(int seed) {
for(int i = 0; i < M; i++) {
bits[i] = (((1 << i) & seed) >>> i) == 1;
}
}
/* generate a random int uniformly on the interval [-2^31 + 1, 2^31 - 1] */
public short nextShort() {
//printBits();
// calculate the integer value from the registers
short next = 0;
for(int i = 0; i < M; i++) {
next |= (bits[i] ? 1 : 0) << i;
}
// allow for zero without allowing for -2^31
if (next < 0) next++;
// calculate the last register from all the preceding
bits[M] = false;
for(int i = 0; i < TAPS.length; i++) {
bits[M] ^= bits[M - TAPS[i]];
}
// shift all the registers
for(int i = 0; i < M; i++) {
bits[i] = bits[i + 1];
}
return next;
}
/** returns random double uniformly over [0, 1) */
public double nextDouble() {
return ((nextShort() / (Integer.MAX_VALUE + 1.0)) + 1.0) / 2.0;
}
/** returns random boolean */
public boolean nextBoolean() {
return nextShort() >= 0;
}
public void printBits() {
System.out.print(bits[M] ? 1 : 0);
System.out.print(" -> ");
for(int i = M - 1; i >= 0; i--) {
System.out.print(bits[i] ? 1 : 0);
}
System.out.println();
}
public static void main(String[] args) {
LFSR rng = new LFSR();
Vector<Short> vec = new Vector<Short>();
for(int i = 0; i <= 32766; i++) {
short next = rng.nextShort();
// just testing/asserting to make
// sure the number doesn't repeat on a given list
if (vec.contains(next))
throw new RuntimeException("Index repeat: " + i);
vec.add(next);
System.out.println(next);
}
}
}
Another approach which allows you to specify how many numbers you want with size and the min and max values of the returned numbers
public static int getRandomInt(int min, int max) {
Random random = new Random();
return random.nextInt((max - min) + 1) + min;
}
public static ArrayList<Integer> getRandomNonRepeatingIntegers(int size, int min,
int max) {
ArrayList<Integer> numbers = new ArrayList<Integer>();
while (numbers.size() < size) {
int random = getRandomInt(min, max);
if (!numbers.contains(random)) {
numbers.add(random);
}
}
return numbers;
}
To use it returning 7 numbers between 0 and 25.
ArrayList<Integer> list = getRandomNonRepeatingIntegers(7, 0, 25);
for (int i = 0; i < list.size(); i++) {
System.out.println("" + list.get(i));
}
The most efficient, basic way to have non-repeating random numbers is explained by this pseudo-code. There is no need to have nested loops or hashed lookups:
// get 5 unique random numbers, possible values 0 - 19
// (assume desired number of selections < number of choices)
const int POOL_SIZE = 20;
const int VAL_COUNT = 5;
declare Array mapping[POOL_SIZE];
declare Array results[VAL_COUNT];
declare i int;
declare r int;
declare max_rand int;
// create mapping array
for (i=0; i<POOL_SIZE; i++) {
mapping[i] = i;
}
max_rand = POOL_SIZE-1; // start loop searching for maximum value (19)
for (i=0; i<VAL_COUNT; i++) {
r = Random(0, max_rand); // get random number
results[i] = mapping[r]; // grab number from map array
mapping[r] = max_rand; // place item past range at selected location
max_rand = max_rand - 1; // reduce random scope by 1
}
Suppose first iteration generated random number 3 to start (from 0 - 19). This would make results[0] = mapping[3], i.e., the value 3. We'd then assign mapping[3] to 19.
In the next iteration, the random number was 5 (from 0 - 18). This would make results[1] = mapping[5], i.e., the value 5. We'd then assign mapping[5] to 18.
Now suppose the next iteration chose 3 again (from 0 - 17). results[2] would be assigned the value of mapping[3], but now, this value is not 3, but 19.
This same protection persists for all numbers, even if you got the same number 5 times in a row. E.g., if the random number generator gave you 0 five times in a row, the results would be: [ 0, 19, 18, 17, 16 ].
You would never get the same number twice.
Generating all the indices of a sequence is generally a bad idea, as it might take a lot of time, especially if the ratio of the numbers to be chosen to MAX is low (the complexity becomes dominated by O(MAX)). This gets worse if the ratio of the numbers to be chosen to MAX approaches one, as then removing the chosen indices from the sequence of all also becomes expensive (we approach O(MAX^2/2)). But for small numbers, this generally works well and is not particularly error-prone.
Filtering the generated indices by using a collection is also a bad idea, as some time is spent in inserting the indices into the sequence, and progress is not guaranteed as the same random number can be drawn several times (but for large enough MAX it is unlikely). This could be close to complexity O(k n log^2(n)/2), ignoring the duplicates and assuming the collection uses a tree for efficient lookup (but with a significant constant cost k of allocating the tree nodes and possibly having to rebalance).
Another option is to generate the random values uniquely from the beginning, guaranteeing progress is being made. That means in the first round, a random index in [0, MAX] is generated:
items i0 i1 i2 i3 i4 i5 i6 (total 7 items)
idx 0 ^^ (index 2)
In the second round, only [0, MAX - 1] is generated (as one item was already selected):
items i0 i1 i3 i4 i5 i6 (total 6 items)
idx 1 ^^ (index 2 out of these 6, but 3 out of the original 7)
The values of the indices then need to be adjusted: if the second index falls in the second half of the sequence (after the first index), it needs to be incremented to account for the gap. We can implement this as a loop, allowing us to select arbitrary number of unique items.
For short sequences, this is quite fast O(n^2/2) algorithm:
void RandomUniqueSequence(std::vector<int> &rand_num,
const size_t n_select_num, const size_t n_item_num)
{
assert(n_select_num <= n_item_num);
rand_num.clear(); // !!
// b1: 3187.000 msec (the fastest)
// b2: 3734.000 msec
for(size_t i = 0; i < n_select_num; ++ i) {
int n = n_Rand(n_item_num - i - 1);
// get a random number
size_t n_where = i;
for(size_t j = 0; j < i; ++ j) {
if(n + j < rand_num[j]) {
n_where = j;
break;
}
}
// see where it should be inserted
rand_num.insert(rand_num.begin() + n_where, 1, n + n_where);
// insert it in the list, maintain a sorted sequence
}
// tier 1 - use comparison with offset instead of increment
}
Where n_select_num is your 5 and n_number_num is your MAX. The n_Rand(x) returns random integers in [0, x] (inclusive). This can be made a bit faster if selecting a lot of items (e.g. not 5 but 500) by using binary search to find the insertion point. To do that, we need to make sure that we meet the requirements.
We will do binary search with the comparison n + j < rand_num[j] which is the same as n < rand_num[j] - j. We need to show that rand_num[j] - j is still a sorted sequence for a sorted sequence rand_num[j]. This is fortunately easily shown, as the lowest distance between two elements of the original rand_num is one (the generated numbers are unique, so there is always difference of at least 1). At the same time, if we subtract the indices j from all the elements rand_num[j], the differences in index are exactly 1. So in the "worst" case, we get a constant sequence - but never decreasing. The binary search can therefore be used, yielding O(n log(n)) algorithm:
struct TNeedle { // in the comparison operator we need to make clear which argument is the needle and which is already in the list; we do that using the type system.
int n;
TNeedle(int _n)
:n(_n)
{}
};
class CCompareWithOffset { // custom comparison "n < rand_num[j] - j"
protected:
std::vector<int>::iterator m_p_begin_it;
public:
CCompareWithOffset(std::vector<int>::iterator p_begin_it)
:m_p_begin_it(p_begin_it)
{}
bool operator ()(const int &r_value, TNeedle n) const
{
size_t n_index = &r_value - &*m_p_begin_it;
// calculate index in the array
return r_value < n.n + n_index; // or r_value - n_index < n.n
}
bool operator ()(TNeedle n, const int &r_value) const
{
size_t n_index = &r_value - &*m_p_begin_it;
// calculate index in the array
return n.n + n_index < r_value; // or n.n < r_value - n_index
}
};
And finally:
void RandomUniqueSequence(std::vector<int> &rand_num,
const size_t n_select_num, const size_t n_item_num)
{
assert(n_select_num <= n_item_num);
rand_num.clear(); // !!
// b1: 3578.000 msec
// b2: 1703.000 msec (the fastest)
for(size_t i = 0; i < n_select_num; ++ i) {
int n = n_Rand(n_item_num - i - 1);
// get a random number
std::vector<int>::iterator p_where_it = std::upper_bound(rand_num.begin(), rand_num.end(),
TNeedle(n), CCompareWithOffset(rand_num.begin()));
// see where it should be inserted
rand_num.insert(p_where_it, 1, n + p_where_it - rand_num.begin());
// insert it in the list, maintain a sorted sequence
}
// tier 4 - use binary search
}
I have tested this on three benchmarks. First, 3 numbers were chosen out of 7 items, and a histogram of the items chosen was accumulated over 10,000 runs:
4265 4229 4351 4267 4267 4364 4257
This shows that each of the 7 items was chosen approximately the same number of times, and there is no apparent bias caused by the algorithm. All the sequences were also checked for correctness (uniqueness of contents).
The second benchmark involved choosing 7 numbers out of 5000 items. The time of several versions of the algorithm was accumulated over 10,000,000 runs. The results are denoted in comments in the code as b1. The simple version of the algorithm is slightly faster.
The third benchmark involved choosing 700 numbers out of 5000 items. The time of several versions of the algorithm was again accumulated, this time over 10,000 runs. The results are denoted in comments in the code as b2. The binary search version of the algorithm is now more than two times faster than the simple one.
The second method starts being faster for choosing more than cca 75 items on my machine (note that the complexity of either algorithm does not depend on the number of items, MAX).
It is worth mentioning that the above algorithms generate the random numbers in ascending order. But it would be simple to add another array to which the numbers would be saved in the order in which they were generated, and returning that instead (at negligible additional cost O(n)). It is not necessary to shuffle the output: that would be much slower.
Note that the sources are in C++, I don't have Java on my machine, but the concept should be clear.
EDIT:
For amusement, I have also implemented the approach that generates a list with all the indices 0 .. MAX, chooses them randomly and removes them from the list to guarantee uniqueness. Since I've chosen quite high MAX (5000), the performance is catastrophic:
// b1: 519515.000 msec
// b2: 20312.000 msec
std::vector<int> all_numbers(n_item_num);
std::iota(all_numbers.begin(), all_numbers.end(), 0);
// generate all the numbers
for(size_t i = 0; i < n_number_num; ++ i) {
assert(all_numbers.size() == n_item_num - i);
int n = n_Rand(n_item_num - i - 1);
// get a random number
rand_num.push_back(all_numbers[n]); // put it in the output list
all_numbers.erase(all_numbers.begin() + n); // erase it from the input
}
// generate random numbers
I have also implemented the approach with a set (a C++ collection), which actually comes second on benchmark b2, being only about 50% slower than the approach with the binary search. That is understandable, as the set uses a binary tree, where the insertion cost is similar to binary search. The only difference is the chance of getting duplicate items, which slows down the progress.
// b1: 20250.000 msec
// b2: 2296.000 msec
std::set<int> numbers;
while(numbers.size() < n_number_num)
numbers.insert(n_Rand(n_item_num - 1)); // might have duplicates here
// generate unique random numbers
rand_num.resize(numbers.size());
std::copy(numbers.begin(), numbers.end(), rand_num.begin());
// copy the numbers from a set to a vector
Full source code is here.
Your problem seems to reduce to choose k elements at random from a collection of n elements. The Collections.shuffle answer is thus correct, but as pointed out inefficient: its O(n).
Wikipedia: Fisher–Yates shuffle has a O(k) version when the array already exists. In your case, there is no array of elements and creating the array of elements could be very expensive, say if max were 10000000 instead of 20.
The shuffle algorithm involves initializing an array of size n where every element is equal to its index, picking k random numbers each number in a range with the max one less than the previous range, then swapping elements towards the end of the array.
You can do the same operation in O(k) time with a hashmap although I admit its kind of a pain. Note that this is only worthwhile if k is much less than n. (ie k ~ lg(n) or so), otherwise you should use the shuffle directly.
You will use your hashmap as an efficient representation of the backing array in the shuffle algorithm. Any element of the array that is equal to its index need not appear in the map. This allows you to represent an array of size n in constant time, there is no time spent initializing it.
Pick k random numbers: the first is in the range 0 to n-1, the second 0 to n-2, the third 0 to n-3 and so on, thru n-k.
Treat your random numbers as a set of swaps. The first random index swaps to the final position. The second random index swaps to the second to last position. However, instead of working against a backing array, work against your hashmap. Your hashmap will store every item that is out of position.
int getValue(i)
{
if (map.contains(i))
return map[i];
return i;
}
void setValue(i, val)
{
if (i == val)
map.remove(i);
else
map[i] = val;
}
int[] chooseK(int n, int k)
{
for (int i = 0; i < k; i++)
{
int randomIndex = nextRandom(0, n - i); //(n - i is exclusive)
int desiredIndex = n-i-1;
int valAtRandom = getValue(randomIndex);
int valAtDesired = getValue(desiredIndex);
setValue(desiredIndex, valAtRandom);
setValue(randomIndex, valAtDesired);
}
int[] output = new int[k];
for (int i = 0; i < k; i++)
{
output[i] = (getValue(n-i-1));
}
return output;
}
You could use one of the classes implementing the Set interface (API), and then each number you generate, use Set.add() to insert it.
If the return value is false, you know the number has already been generated before.
Instead of doing all this create a LinkedHashSet object and random numbers to it by Math.random() function .... if any duplicated entry occurs the LinkedHashSet object won't add that number to its List ... Since in this Collection Class no duplicate values are allowed .. in the end u get a list of random numbers having no duplicated values .... :D
With Java 8 upwards you can use the ints method from the IntStream interface:
Returns an effectively unlimited stream of pseudorandom int values.
Random r = new Random();
int randomNumberOrigin = 0;
int randomNumberBound = 10;
int size = 5;
int[] unique = r.ints(randomNumberOrigin, randomNumberBound)
.distinct()
.limit(size)
.toArray();
Following code create a sequence random number between [1,m] that was not generated before.
public class NewClass {
public List<Integer> keys = new ArrayList<Integer>();
public int rand(int m) {
int n = (int) (Math.random() * m + 1);
if (!keys.contains(n)) {
keys.add(n);
return n;
} else {
return rand(m);
}
}
public static void main(String[] args) {
int m = 4;
NewClass ne = new NewClass();
for (int i = 0; i < 4; i++) {
System.out.println(ne.rand(m));
}
System.out.println("list: " + ne.keys);
}
}
The most easy way is use nano DateTime as long format.
System.nanoTime();
There is algorithm of card batch: you create ordered array of numbers (the "card batch") and in every iteration you select a number at random position from it (removing the selected number from the "card batch" of course).
Here is an efficient solution for fast creation of a randomized array. After randomization you can simply pick the n-th element e of the array, increment n and return e. This solution has O(1) for getting a random number and O(n) for initialization, but as a tradeoff requires a good amount of memory if n gets large enough.
There is a more efficient and less cumbersome solution for integers than a Collections.shuffle.
The problem is the same as successively picking items from only the un-picked items in a set and setting them in order somewhere else. This is exactly like randomly dealing cards or drawing winning raffle tickets from a hat or bin.
This algorithm works for loading any array and achieving a random order at the end of the load. It also works for adding into a List collection (or any other indexed collection) and achieving a random sequence in the collection at the end of the adds.
It can be done with a single array, created once, or a numerically ordered collectio, such as a List, in place. For an array, the initial array size needs to be the exact size to contain all the intended values. If you don't know how many values might occur in advance, using a numerically orderred collection, such as an ArrayList or List, where the size is not immutable, will also work. It will work universally for an array of any size up to Integer.MAX_VALUE which is just over 2,000,000,000. List objects will have the same index limits. Your machine may run out of memory before you get to an array of that size. It may be more efficient to load an array typed to the object types and convert it to some collection, after loading the array. This is especially true if the target collection is not numerically indexed.
This algorithm, exactly as written, will create a very even distribution where there are no duplicates. One aspect that is VERY IMPORTANT is that it has to be possible for the insertion of the next item to occur up to the current size + 1. Thus, for the second item, it could be possible to store it in location 0 or location 1. For the 20th item, it could be possible to store it in any location, 0 through 19. It is just as possible the first item to stay in location 0 as it is for it to end up in any other location. It is just as possible for the next new item to go anywhere, including the next new location.
The randomness of the sequence will be as random as the randomness of the random number generator.
This algorithm can also be used to load reference types into random locations in an array. Since this works with an array, it can also work with collections. That means you don't have to create the collection and then shuffle it or have it ordered on whatever orders the objects being inserted. The collection need only have the ability to insert an item anywhere in the collection or append it.
// RandomSequence.java
import java.util.Random;
public class RandomSequence {
public static void main(String[] args) {
// create an array of the size and type for which
// you want a random sequence
int[] randomSequence = new int[20];
Random randomNumbers = new Random();
for (int i = 0; i < randomSequence.length; i++ ) {
if (i == 0) { // seed first entry in array with item 0
randomSequence[i] = 0;
} else { // for all other items...
// choose a random pointer to the segment of the
// array already containing items
int pointer = randomNumbers.nextInt(i + 1);
randomSequence[i] = randomSequence[pointer];
randomSequence[pointer] = i;
// note that if pointer & i are equal
// the new value will just go into location i and possibly stay there
// this is VERY IMPORTANT to ensure the sequence is really random
// and not biased
} // end if...else
} // end for
for (int number: randomSequence) {
System.out.printf("%2d ", number);
} // end for
} // end main
} // end class RandomSequence
It really all depends on exactly WHAT you need the random generation for, but here's my take.
First, create a standalone method for generating the random number.
Be sure to allow for limits.
public static int newRandom(int limit){
return generatedRandom.nextInt(limit); }
Next, you will want to create a very simple decision structure that compares values. This can be done in one of two ways. If you have a very limited amount of numbers to verify, a simple IF statement will suffice:
public static int testDuplicates(int int1, int int2, int int3, int int4, int int5){
boolean loopFlag = true;
while(loopFlag == true){
if(int1 == int2 || int1 == int3 || int1 == int4 || int1 == int5 || int1 == 0){
int1 = newRandom(75);
loopFlag = true; }
else{
loopFlag = false; }}
return int1; }
The above compares int1 to int2 through int5, as well as making sure that there are no zeroes in the randoms.
With these two methods in place, we can do the following:
num1 = newRandom(limit1);
num2 = newRandom(limit1);
num3 = newRandom(limit1);
num4 = newRandom(limit1);
num5 = newRandom(limit1);
Followed By:
num1 = testDuplicates(num1, num2, num3, num4, num5);
num2 = testDuplicates(num2, num1, num3, num4, num5);
num3 = testDuplicates(num3, num1, num2, num4, num5);
num4 = testDuplicates(num4, num1, num2, num3, num5);
num5 = testDuplicates(num5, num1, num2, num3, num5);
If you have a longer list to verify, then a more complex method will yield better results both in clarity of code and in processing resources.
Hope this helps. This site has helped me so much, I felt obliged to at least TRY to help as well.
I created a snippet that generates no duplicate random integer. the advantage of this snippet is that you can assign the list of an array to it and generate the random item, too.
No duplication random generator class
With Java 8 using the below code, you can create 10 distinct random Integer Numbers within a range of 1000.
Random random = new Random();
Integer[] input9 = IntStream.range(1, 10).map(i -> random.nextInt(1000)).boxed().distinct()
.toArray(Integer[]::new);
System.out.println(Arrays.toString(input9));
Modify the range to generate more numbers example : range(1,X). It will generate X distinct random numbers.
Modify the nextInt value to select the random number range : random.nextInt(Y)::random number will be generated within the range Y
My assignment is to merge two arrays using int arrays that the user fills and we have to assume that there will be a maximum of 10000 inputs from the user, and the user inputs a negative number to stop. Then sort the array from least to greatest and print it out. Initially i thought that this would be quite easy but when i finished, i began getting outputs such as:
Enter the values for the first array, up to 10000 values, enter a negative number to quit: 1
3
5
-1
Enter the values for the second array, up to 10000 values, enter a negative number to quit
2
4
6
-1
First Array:
1
3
5
Second Array:
2
4
6
Merged Array:
6 1 2 3 4 5
as you can see, the six is out of place and i have no idea how to fix it. Here is the source code, i have included copious comments because I really want you guys to help me out to the best of your abilities. IF it's possible to use the same exact technique without implement new techniques and methods into the code please do so. I know there are methods in java that can do all of this in one line but it's for an assignment at a more basic level.
import java.util.Scanner;
public class Merge
{
public static void main(String [] args)
{
Scanner scan = new Scanner(System.in);
int [] first = new int[10000]; //first array, assume 10k inputs max
int [] second = new int[10000]; //first array, assume 10k inputs max
boolean legal = true; //WILL IMPLIMENT LATER
int end = 0; // set how many elements to put in my "both" array
int end2 = 0;// set how many elements to put in my "both" array
System.out.print("Enter the values for the first array, up to 10000 values, enter a negative number to quit");
//get values
for(int i = 0; i<first.length; i++)
{
first[i] = scan.nextInt(); //fill first with user input
if(first[i] <0) //if negative number, stop loop
{
end = i; //get position of end of user input
break;
}
}
System.out.println("Enter the values for the second array, up to 10000 values, enter a negative number to quit");
for(int i = 0; i<second.length; i++) //exact same as the first get values loop
{
second[i] = scan.nextInt();
if(second[i] <0)
{
end2 = i;
break;
}
}
System.out.print("First Array:\n");
for(int i = 0; i<first.length; i++) //print first array
{
if(i == end) //this prevents from printing thousands of zeros, only prints values that user inputed
break;
System.out.println(first[i] + " ");
}
System.out.print("Second Array:\n");
for(int i = 0; i<second.length; i++) //same as printing first array
{
if(i == end2)
break;
System.out.println(second[i] + " ");
}
int [] both = new int[(end)+(end2)]; //instanciate an int array to hold only inputted values from first[] and second[]
int [] bothF = new int[(end)+(end2)]; //this is for my simple sorter algotithm loop
for(int i = 0; i<both.length; i++) //fill both with the first array that was filled
{
both[i] = first[i];
}
int temp = end; // see below
for(int i = 0;i<both.length; i++) //fill array with the second array that was filled(starting from the end of the first array so that the first set is not overwritten
{
if(temp<both.length){ //this prevents an out of bounds
both[temp] = second[i];
temp++;}
}
//simple sorting algorithm
for(int d = both.length -1;d>=0;d--)
{
for(int i = 0; i<both.length; i++)
{
if(both[d]<both[i])
{
bothF[d] = both[d];
both[d] = both[i];
both[i] = bothF[d];
}
}
}
System.out.println("Merged Array:"); //print the results
for(int i = 0; i<both.length; i++)
{
System.out.print(both[i] + " ");
}
//System.out.println("ERROR: Array not in correct order");
}
Your sorting algorithm is faulty.
It's similar to selection sort, in that you take two elements and swap them if they're out of place. However, you don't stop the comparisons when you should: when the index d is less than the index i, the comparison-and-swap based on arr[d] > arr[i] is no longer valid.
The inner loop should terminate with i=d.
The logic of your sort goes something like this:
On the d-th loop, the elements at d+1 and to the right are correctly sorted (the larger numbers). This is true at the beginning, because there are 0 elements correctly sorted to the right of the right-most element.
On each of the outer loops (with the d counter), compare the d-th largest element slot with every unsorted element, and swap if the other element is larger.
This is sufficient to sort the array, but if you begin to compare the d-th largest element slot with already-sorted elements to its right, you'll end up with a larger number in the slot than should be. Therefore, the inner loop should terminate when it reaches d.
Sure, you can do it like this
for (int i = 0; i < end; i++) {
both[i] = first[i];
}
for (int i = 0; i < end2; i++) {
both[i + end] = second[i];
}
// simple sorting algorithm
for (int d = both.length - 1; d >= 0; d--) {
for (int i = 0; i < d; i++) {
if (both[i] > both[d]) {
int t = both[d];
both[d] = both[i];
both[i] = t;
}
}
}
Output(s) -
Enter the values for the first array, up to 10000 values, enter a negative number to quit3
5
-1
Enter the values for the second array, up to 10000 values, enter a negative number to quit
2
4
6
-1
First Array:
3
5
Second Array:
2
4
6
-1
Merged Array:
2 3 4 5 6
First I will start with some recommendations:
1.Give end1 and end2 the initial value as the array lengths.
The printing part - instead of breaking the loop - loop till i == end(if its not changed by the first part it will stay the array length).
One suggestion is to use a "while" statement on the user input to do the reading part (it seems cleaner then breaking the loop- but its OK to do it like you have done too).
Try to use more functions.
now to the main thing- why not to insert the numbers from both arrays to the join array keeping them sorted?
Guiding:
Keep a marker for each array.
Iterate over the new join array If arr1[marker1]> arr2[marker2]
insert arr2[marker2] to the joint array in the current position.
and add 1 to marker2. and the opposite.
(don't forget to choose what happens if the are equal).
This can be achieved because the arrays were sorted in the first place.
Have fun practicing!
I guess you have sort of a reverse "selection sort"-algorithm going on there. I made an class that run your code and printed out the output after every swap. Here is the code which is the same as you got in your application with the addition of print.
for(int d = both.length -1;d>=0;d--)
{
for(int i = 0; i<both.length; i++)
{
if(both[d]<both[i])
{
int temp = both[d];
both[d] = both[i];
both[i] = temp;
printArray(both);
}
}
}
and when we run this on an example array we get this output
[9, 8, 7, 6]=
-> 6879
-> 6789
-> 6798
-> 6978
-> 9678
The algorithm actually had the correct answer after two swaps but then it started shuffling them into wrong order. The issue is the inner for loops end parameter. When you have run the outer loop once, you can be certain that the biggest number is in the end. 'd' is here 3 and it will swap out a bigger number every time it encounters it. the if clause comparisions in the first loop is 6-9 (swap), 9-8, 9-7, 9-9. All good so far.
Potential problems comes in the second iteration with 'd' as 2. Array is now [6,8,7,9] and comparisons are 7-6, 7-8 (swap with result [6,7,8,9]), 8-8, 8-9 (swap!!) resulting in [6,7,9,8]. the last swap was the problematic one. We knew that the biggest number was already in the last spot, but we still compare against it. with every gotrough of the whole inner loop it will always find the biggest number (and all other bigger than both[d] that is already in place) and swap it to some wrong position.
As we know that the biggest number will be last after one iteration of the outer loop, we shouldn't compare against it in the second iteration. You sort of lock the 9 in the array and only try to sort the rest, being in this case [6,8,7] where d = 3, value 7. hence, your inner loop for(int i = 0; i<both.length; i++) becomes for(int i = 0; i<=d; i++). As an added bonus, you know that in the last iteration i==d, and thus the code inside it, if(both[d]<both[i]) will never be true, and you can further enhance the loop into for(int i = 0; i<d; i++).
In your algorithm you always do four comparisons in the inner loop over four iterations of the outer loop, which means there is a total of 16 comparisons. if we use the i<d we'll just do three comparisons in the inner loop on the first iteration of the outer loop, then two, then one. This brings it to a total of six comparisons.
Sorry if too rambling, just wanted to be thorough.