int_(26)^( pi/4)sqrt(tan x)dx

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The value of int_(0)^(pi/4) sqrt(tanx) dx+int_(0)^(pi/4) sqrt(cotx) dx is equal to

Show that int_(0)^(pi//4) (sqrt(tan x )+sqrt(cot x))dx= pi/sqrt(2)

int_(0)^((pi)/(4))sqrt(tan x)dx

int_(0)^(pi//4)[sqrt(tan x) + sqrt(cot x)] = dx

int_(0)^(pi//4) [sqrt(tan x)+sqrt(cot x)]dx

Prove that: int_(0)^((pi)/(4))(sqrt(tan x)+sqrt(cot x)dx=sqrt(2)*(pi)/(2)

The value of int_0^(pi//4) sqrt(tan x dx) +int_0^(pi//4) sqrt(cot x dx) is equal to

Evaluate int_(0)^((pi)/(4))(sqrt(tan x)+sqrt(cot x))dx

Show that : int_(0)^(pi//2) (sqrt(tan x) +sqrt(cot x))dx=sqrt(2)pi .