We can use this fact to determine numbers that multiply to give a specific number.Answer and Explanation: There are several different numbers we could multiply to get -9. To determine two number that multiply to give -9, we simply divide -9 by any number, ......
What do you get when you add up all the numbers from 1 to 100 consecutively? What two numbers multiply to -24 and add to 2? What number is added to itself makes 14? What two numbers equals 19 when added and have a difference of 7?
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Multiply radians by (180/pi) to get degrees. What two numbers add to get 19 and multiply to get 180? 199 What two number can be multiply by 180? Any (and every) number can be multiplied by 180. What is 180 in percent? To convert 180 to percent just multiply by 100. So, 180 &...
What numbers multiply to equal .042The question is: What two numbers multiplied equals.042? The answer from those two numbers has to equal .16. Example: What two numbers when multiplied equals 42 and when those two numbers are added together they equal 13. 7*6= 42 7+6= 13...
We can write the list of multiplies of a number by multiplying it with natural numbers. Example:What are the multiples of 4? To create a list of multiples of 4, we multiply 4 by the numbers 1, 2, 3, and so on as shown below: ...
I've written a program that attempts to find Amicable Pairs. This requires finding the sums of the proper divisors of numbers. Here is my current sumOfDivisors() method: int sumOfDivisors(int n) { int sum = 1; int bound = (int) sqrt(n); for(int i = 2; i <= 1 + bound; i...
The action of means that one can also meaningfully multiply by any natural number, and translate it by any integer. As with other applications of the correspondence principle, the main advantage of moving to this more “virtual” setting is that one now acquires a probability measure , so ...
We can multiply 4 times 8 to get 32, so 4 and 8 are factors of 32. But 4 and 8 are like the frosting and the cream in the donut; they are parts, but they are not the smallest possible parts. The numbers 4 and 8 can each be divided evenly by another number: the number 2. ...
The key observation is that given any -smooth numbers , some non-trivial subcollection of them will multiply to a square. This is essentially Lemma 4.2 of Bui–Pratt–Zaharescu, but for the convenience of the reader we give a full proof here. Consider the multiplicative homomorphism defined ...