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प्रश्न
Find the area of the region bounded by y = tan x, y = cot x and the lines x = 0, x = `pi/2`, y = 0
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उत्तर
First find the intersecting point of y = tan x and y = cot x
tan x = cot x
`tanx/cotx` = 1
tan2x = 1
tan x = 1
x = `pi/4`, y = 1
Required Area = `int_0^(pi/2) tan x "d"x + int_(pi/4)^(pi/2) cot x "d"x`
= `[log sec x]_0^(pi/4) + [log sin x]_(pi/4)^(pi/2)`
= `[log sec pi/4 - log sec 0] + log sin pi/2 - log sin pi/4]`
= `log sqrt(2) - 0 + 0 - log 1/sqrt(2)`
= `log sqrt(2) + log sqrt(2)`
= `2 log sqrt(2)`
= `log(sqrt2)^2`
= log 2 sq.units
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