Jason builds doghouses for a pet store. Each doghouse is a wooden structure with a rectangular base that has an area of 21 square feet and a length that is 4 feet more than its width.If x represents the width of the doghouse, write an equation in the given form that can be used to determine the possible dimensions of the base of the doghouse.
Solución de tutoría real
Respuesta rápida
\(x( x + 4) = 21\)
Solución paso a paso
Let \(x\) be the width of the doghouse in feet. The length of the doghouse is 4 feet more than the width, so the length is \(x + 4\) feet.
The area of the rectangular base is given by:
\[\text { Area} = \text { width} \times \text { length} \]
Substituting the given values:
\[21 = x \times ( x + 4) \]
So, the equation that can be used to determine the possible dimensions of the base of the doghouse is:
\[x( x + 4) = 21\]
Supplemental Knowledge
Quadratic equations are polynomial equations of the form \(ax^ 2 + bx + c = 0\). They often arise in problems involving areas, projectile motion, and optimization. To solve these equations, you can use various methods such as factoring, completing the square, or using the quadratic formula.
From Concepts to Reality
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