To find the answer to "What two numbers have a product of 48 and a sum of 53?" we first state what we know. We are looking for x and y and we know that x • y = 48 and x + y = 53.
Before we keep going, it is important to know that x • y is the same as y • x and x + y is the same as y + x. The two variables are interchangeable. Which means that when we create one equation to solve the problem, we will have two answers.
To solve the problem, we take x + y = 53 and solve it for y to get y = 53 - x. Then, we replace y in x • y = 48 with 53 - x to get this:
x • (53 - x) = 48
Like we said above, the x and y are interchangeable, therefore the x in the equation above could also be y. The bottom line is that when we solved the equation we got two answers which are the two numbers that have a product of 48 and a sum of 53. The numbers are:
0.92169
52.07831
That's it! The two numbers that have a product of 48 and a sum of 53 are 0.92169 and 52.07831 as proven below:
0.92169 • 52.07831 ≈ 48
0.92169 + 52.07831 = 53
Note: Answers are rounded up to the nearest five decimals if necessary so the answers may not be exact.
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