Question 1

Simplify . (1/c + 1/h)/(1/(c ^ 2) - 1/(r ^ 2))

Question 2

Answer:

$(\left(h+c\right)cr^2)/(h\left(r^2-c^2\right))$

Explanation:

((1)/(c)+(1)/(h))/((1)/(c^2)-(1)/(r^2))

Combine
(1)/(c) + (1)/(h)

((h+c)/(ch))/((1)/(c^2)-(1)/(r^2))

Combine the bottom, too.

=((h+c)/(ch))/((r^2-c^2)/(c^2r^2))

Apply the fraction rule

$=(\left(h+c\right)c^2r^2)/(ch\left(r^2-c^2\right))$

Cancel

$=(\left(h+c\right)cr^2)/(h\left(r^2-c^2\right))$

Therefore,
$(\left((1)/(c)+(1)/(h)\right))/(\left((1)/(\left(c^2\right))-(1)/(\left(r^2\right))\right)):\quad (\left(h+c\right)cr^2)/(h\left(r^2-c^2\right))$

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