QUESTION IMAGE
Question
divide.
\\(\dfrac{49x^2 - 25}{2x^2 + x - 21} \div \dfrac{7x + 5}{4x - 12}\\)
simplify your answer as much as
Step1: Rewrite division as multiplication
$\frac{49x^2 - 25}{2x^2 + x - 21} \times \frac{4x - 12}{7x + 5}$
Step2: Factor all expressions
$49x^2 -25=(7x-5)(7x+5)$; $2x^2+x-21=(2x+7)(x-3)$; $4x-12=4(x-3)$
Substitute factored forms:
$\frac{(7x-5)(7x+5)}{(2x+7)(x-3)} \times \frac{4(x-3)}{7x+5}$
Step3: Cancel common factors
Cancel $(7x+5)$ and $(x-3)$:
$\frac{(7x-5) \times 4}{2x+7}$
Step4: Simplify the expression
$\frac{4(7x-5)}{2x+7} = \frac{28x - 20}{2x + 7}$
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$\frac{28x - 20}{2x + 7}$ (or $\frac{4(7x-5)}{2x+7}$)