If `sinA = 2/sqrt(5)` and `cosB = 1/sqrt(10)`, where A and B are acute angles, then what is the value of `A+B`

If sin A=1/sqrt10 and sin B=1/sqrt5 , where A and B are positive acute angles, then A+B=

If sin A=(1)/(sqrt(10)) and sin B=(1)/(sqrt(5)), where A and B are positive acute angles,then A+B is equal to

If sin A = 1/sqrt10 and sin B =1/sqrt5 , where A and B are positive acute angles, then A + B is equal to.................. A) pi B) pi/2 C) pi/3 D) pi/4

If sinA=(1)/(sqrt(10))andsinB=(1)/(sqrt(5)) , where A and B are positive acute angles, then A+B=?

If sin A=1//sqrt(10), sin B= 1//sqrt(5) where A and B are positive and acute , then A +B=

If sin A = 1/ sqrt(5) , cos B = 3/ sqrt(10) , A, B being positive acute angles, then what is (A + B) equal to ?

If A and B are acute angle such that SinA=CosB then the value of (A+B) is

If A and B are acute angles and sinA=cosB then A+B=