Math, asked by tarkeshwarrai941, 11 months ago

If coshx=5/2 find the values of cosh2x and sinh2x

Answers

Answered by HappiestWriter012

Given, coshx = 5/2

We know that,

cosh(2x) = 2 cosh²x - 1

$cosh(2x) = 2( \frac{5}{2} ) ^{2} - 1 \\ \\ cosh(2x)= 2( \frac{25}{4} ) - 1 \\ \\ cosh(2x) = \frac{25}{2} - 1 \\ \\ cosh(2x) = \frac{25 - 2}{2} \\ \\ cosh(2x) = \frac{23}{2}$

We also know that,

cosh²α - sinh²α = 1

$cosh ^{2} (2x) - sinh ^{2} (2x) = 1 \\ \\ cosh ^{2} (2x) - 1 = sinh ^{2} (2x) \\ \\ (\frac{23}{2} ) ^{2} - 1 = sinh^2(2x) \\ \\ sinh^2(2x) = \frac{529}{4} - 1 \\ \\ sinh ^{2} (2x) = \frac{525}{4} \\ \\ sinh(2x) = \sqrt{ \frac{525}{4} } \\ \\ sinh(2x) = \frac{5 \sqrt{21} }{2}$

Therefore, sinh(2x) = 5√21/2, cosh(2x) = 23/2

Answered by ssbhushan13

Answer:

ok I think it is useful to you

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