Home painting The Area Of A Rectangular Painting Is Given By The Trinomial X^2+4X-21

The Area Of A Rectangular Painting Is Given By The Trinomial X^2+4X-21

The Area Of A Rectangular Painting Is Given By The Trinomial X^2+4X-21. The painting's length is (x+2). Its length is (2x + 2) cm find the width ot the painting.

The length l (in millimeters) of the larvae of the black porgy fish can be modeled by l(x) = 0.00170x 2 + 0.145x + 2.35, 0 ≤ x ≤ 40 where x is the age (in days) of the larvae. X +9 and x —3 c. The area of a rectangular painting is given by the trinomial a2 — 6 — 16.

A — 8 Write The Correct Factored Form For Each.

Hence, to find the dimensions, we need to factorize the given trinomial. O2z1qpv and 12 more users found. Find a pair of values that could represent the dimensions if the rectangle.

The Painting’s Length Is (A + 2).

Two numbers r and s sum up to 14 exactly when the average of the two numbers is frac{1}{2}*14 = 7. Write the correct factored form for. The area of a rectangular door is given by the trinomial x2 — 14.r + 45.

What Are The Possible Dimensions Of The Painting?

The painting’s length is (a + 2). Now, area of the rectangle = length x width. What is the door’s length?

What Is The Door's Length?

The door's width is (x — 9). What is the length of the screen? 2) a familt is having a pool built in their backyard.

What Are The Possible Dimensions Of The Rectangle?

The width ot the platform was (3x — 1) teet and the area was (9×2 +6x — 3) find the length ot this platform. Here, the given expression for area of the rectangle is: What are the possible dimensions of the painting?

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