The angles of a triangle are in Arithmetic Progression. The ratio of the least angles in degrees to the number of radians in the greatest angle is \[60:\pi .\] The angles (in degrees) are [SSC (CGL) 2012] |
A) \[30{}^\circ ,\]\[60{}^\circ ,\]\[90{}^\circ \]
B) \[35{}^\circ ,\]\[55{}^\circ ,\]\[90{}^\circ \]
C) \[40{}^\circ ,\]\[50{}^\circ ,\]\[90{}^\circ \]
D) \[40{}^\circ ,\]\[55{}^\circ ,\]\[85{}^\circ \]
Correct Answer: A
Solution :
Let the angles of a triangle in AP be |
\[(a-d){}^\circ ,\]\[a{}^\circ ,\]\[(a+d){}^\circ .\] |
\[\therefore \] \[a-d+a+a+d=180{}^\circ \] |
[since, sum of all angles of triangle is \[180{}^\circ \]] |
\[\Rightarrow \] \[3a=180{}^\circ \]\[\Rightarrow \]\[a=60{}^\circ \] |
Now, given ratio of least angle to largest angle is \[60:\pi ,\]then |
\[\frac{a-d}{a+b}=\frac{60{}^\circ }{\pi }=\frac{60{}^\circ }{180{}^\circ }=\frac{1}{3}\] |
\[\Rightarrow \] \[\frac{60{}^\circ -d}{60{}^\circ +d}=\frac{1}{3}\] |
\[\Rightarrow \] \[180{}^\circ -3d=60{}^\circ +d\] |
\[\Rightarrow \] \[4d=120{}^\circ \]\[\Rightarrow \]\[d=30{}^\circ \] |
\[\therefore \]Angles of triangle are |
\[a-d=60{}^\circ -30{}^\circ =30{}^\circ \] |
\[a=60{}^\circ \] |
and \[a+d=60{}^\circ +30{}^\circ =90{}^\circ \] |
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