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

Choose the correct answer in each of the following questions: If A and B are acute angles such that sinA = cos B " then " (A+B)=?

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/sin B= sqrt2 and tanA/tanB = sqrt3 , find A and B.

If A and B are acute angles and sinA=1/(5sqrt2) and tanB=1/3 then A+2B=

If A,B are acute angles and sinA = 3/5, cosB =12/13 then find cos(A+B)

If A and B are positive acute angles and sinA =3/5,cosB=(15)/(17) , find the value of (tanA-tanB)/(1+tanAtanB) .

If A and B are acute angles satisfying SinA = Sin^(2) B and 2Cos^(2) A= 3Cos^(2) B then A + B =

If A and B are acute angles such that sinA = sin^(2) B,cos^(2) A = 3 cos^(2) B then

If A and B are acute angles such that sinA=sin^(2)B,2cos^(2)A=3cos^(2)B then B equal to

If angleA and angle B are acute such that cosA=cosB,then show that angleA=angleB