Given that `int(dx)/(sqrt(2ax-x^(2)))=a^(n)sin^(-1)[(x-a)/(a)]`
where, `a` = constant. Using dimensional analysis, the value of `n` is

Given that int (dx)/(sqrt(2 ax - x^2)) = a^n sin^(-1) ((x-a)/(a)) where a is a constant. Using dimensional analysis. The value of n is

int(dx)/(sqrt(1-x^(2))(sin^(-1)x)^(2))

int(dx)/(sqrt(2x-x^2) = a^n sin^-1[x/a-1] The value of n is You may use dimensional analysis to solve the problem.

int_((x sin^(-1)x)/(sqrt(1-x)^(2)))dx

int(sqrt(1+x^2)-x)^n dx

int(e^x[1+sqrt(1-x^2)sin^-1x])/sqrt(1-x^2)dx

Evaluate: int(sin^(-1)x)/(sqrt(1-x^2))\ dx

You may not know integration , but using dimensional analysis you can check on some results . In the integral int ( dx)/(( 2ax - x^(2))^(1//2)) = a^(n) sin^(-1) ((x)/(a) -1) , find the valiue of n .

Evaluate: inte^(sin^-1x)/sqrt (1-x^2)dx

Let x and a stand for distance . Is int (dx)/(sqrt (a^(2) - x^(2))) = (1)/(a) sin^(-1) (a/(x)) dimensionally correct ?