A rectangle has a height of b^3+b^2b
3
+b
2
b, cubed, plus, b, squared and a width of b^2+7b+4b
2
+7b+4b, squared, plus, 7, b, plus, 4.

The area of the rectangle is equal to the product of the height and the width, each of them represented by polynomials. In this question we must apply algebraic handling to simplify the product of the two polynomials:

A = h · w (1)

Where:

h - Height
w - Width

If we know that h = b³ + b² and w = b² + 7 · b + 4, then the area of the rectangle is:

A = (b³ + b²) · (b² + 7 · b + 4)

A = b² · (b + 1) · (b + 0.628) · (b + 6.372)

The area of the rectangle is equal to b² · (b + 1) · (b + 0.628) · (b + 6.372).

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A rectangle has a height of b^3+b^2b 3 +b 2 b, cubed, plus, b, squared and a width of b^2+7b+4b 2 +7b+4b, squared, plus, 7, b, plus, 4.

Respuesta :

What is the area of the rectangle?

Otras preguntas

A rectangle has a height of b^3+b^2b
3
+b
2
b, cubed, plus, b, squared and a width of b^2+7b+4b
2
+7b+4b, squared, plus, 7, b, plus, 4.