Let's break this down step by step The product of two numbers (let's call them a and b) is 48 The sum of those two numbers is 19 Next, we need to find the pairs of factors of 48 The factors of 48 are Therefore, the two numbers are 4 and 12
Their product is indeed 48, and their sum is 19 So, the numbers are 4 and 12 Substitute this expression into the second equation to obtain a quadratic equation in terms of x X2 − 19x + 48 = 0 Solve the quadratic equation by factoring to find the two possible values of x, which are 3 and 16. Enter the product and sum values, and the calculator will determine the combination numbers of the quadratic equation formed, with the steps displayed
Find a pair of factors of 48 with a sum of 19 The product of two numbers is 48 , and the sum is 19 What are the two numbers The product of two numbers is 48 The numbers are 3 and 16 3 x 16 = 48 sum
3 + 16 = 19 By pairing the numbers correctly — 16 as a perfect square and 3 as the prime factor — we could then find the solution
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