If a triangle has angles 45∘,45∘, and 90∘, what is the ratio of the sides of the triangle opposite to these angles respectively?
Let us assume the length of side AB of the triangle to be x cms.
Applying trignometric ratios to the sides, we get :
sin 45∘=(xAC)⇒1√2=(xAC)⇒AC=x√2 ...(i)Similarly,tan 45∘=(xBC)⇒1=(xBC)⇒BC=x ...(ii)
So, the ratios of the sides of the triangle with angles 45∘,45∘& 90∘=x:BC:AC
=x:x:x√2(from (i)&(ii))
=1:1:√2
An alternate and shortcut method of solving this question is:
For the given triangle, as two angles are equal; the two sides opposite to these angles will also be equal.
And as the third angle is 90∘, the triangle is right - angled triangle.
Let us assume the length of the equal sides is equal to x cms.
So, length of the hypotenuse = √(x+x) = √(2x)
So, Ratio of the sides of the triangle = x : x : √2x
→ Ratio of the sides of the triangle = 1 : 1 : √2