Question

Find the value of the expression (2x−12)+(12xy−10)(2x-12)+(12xy-10) for x=4x=4 and y=6y=6.

Answer 1

After substituting x=4 and y=6 into the expression (2x−12)+(12xy−10) and simplifying, the value of the expression is found to be 274.

Step-by-step explanation:

The question asks to find the value of the expression (2x−12)+(12xy−10) for given values of x and y. We are given that x=4 and y=6. Substituting these values into the expression yields:

(2×4 − 12) + (12×4×6 − 10) = (8 − 12) + (288 − 10) = −4 + 278 = 274.

Therefore, the value of the expression is 274.

Answer 2

If you would like to find the value of the expression (2x - 12) + (12xy - 10), you can calculate this using the following steps:

x = 4, y = 6
(2x - 12) + (12xy - 10) = (2 * 4 - 12) + (12 * 4 * 6 - 10) = -4 + 278 = 274

The correct result would be 274.