translate the verbal expression into an algebraic expression. the product of 7 and the square of x…

translate the verbal expression into an algebraic expression. the product of 7 and the square of x, increased by the difference of 5 and x². 7(x² + 5 - x²) 7x²+(5 - x²) (5 + x²)-7x² 7(2x)+(x² - 5)

translate the verbal expression into an algebraic expression. the product of 7 and the square of x, increased by the difference of 5 and x². 7(x² + 5 - x²) 7x²+(5 - x²) (5 + x²)-7x² 7(2x)+(x² - 5)

Answer

Explanation:

Step1: Identify key - terms

The square of (x) is (x^{2}), increased by means addition. The difference of 5 and (x^{2}) is (5 - x^{2}), and product means multiplication.

Step2: Form the expression

We need to multiply 7 by the result of (x^{2}+(5 - x^{2})), so the algebraic expression is (7(x^{2}+(5 - x^{2}))).

Answer:

(7(x^{2}+(5 - x^{2})))