If α and β are angles in the first quadrant \tanα=\dfrac{1}{7}, \sinβ=\dfrac{1}{\sqrt{10} } , then the value of α+2β is
0\degree
30\degree
45\degree
60\degree
Using double angle identity
\cos 2β = 1-2 \sin^2β
= 1-2\Big( \dfrac{1}{\sqrt{10} } \Big) ^2
=\dfrac{4}{5}
Then
\sin 2β =\dfrac{3}{5}
\begin{aligned} \tanα=\dfrac{1}{7} \implies &\sinα = \dfrac{1}{\sqrt{1+7^2} } = \dfrac{1}{\sqrt{50} } = \dfrac{1}{5\sqrt{2} } \\ &\cos α = \dfrac{7}{5\sqrt{2} } \end{aligned}
\cos( α +2β ) = \cos α\cos 2β -\sin α \sin 2β
= \dfrac{7}{5\sqrt{2} }\cdot \dfrac{4}{5} - \dfrac{1}{5\sqrt{2} }\cdot \dfrac{3}{5}
=\dfrac{\sqrt{2} }{2}
Therefore
α +2β = 45\degree
C is the correct choice