Question

uden (t)/(p)ractic (e)/(6397504)ec^(925)b^(20008)bbad 0(c)/(c)las (s)/(62)ea^(961)dbfd 6fd^(0009)c^(3594)(a)/(u)t(a)/(63)b^(5889) iponents Calculate the area of a rectangle given a width of 6x^(4) and a length of 9x+2y^(3) Area:

Answer 1

The area of the rectangle is 54x^5 + 12yx^4.

Step-by-step explanation:

The area of a rectangle can be calculated by multiplying its width by its length. In this case, the width is 6x^4 and the length is 9x + 2y^3. To find the area, we can substitute these values into the formula:

Area = width x length = (6x^4) x (9x + 2y^3)

Next, we can simplify this expression by multiplying the terms together:

Area = 54x^5 + 12yx^4

So, the area of the rectangle is 54x^5 + 12yx^4.