Question

The angle of quadrilateral can be in the ratio 1:2%3:6. Why? Give reasons.?

Answer 1

AnsweR :-

Let the angles of the quadrilateral be

x,2x,3x,6x.

If these are the angles of a quadrilateral,

then

x+2x+3x+6x=360°

12x=360

x=30

Therefore, the angles are 30°,60°,90° &180°.

But , 180 ° cannot be an angle of a quadrilateral .

Hence, the angles of a quadrilateral cannot be in the ratio 1:2:3:6.

Answer 2

Answer:

Step-by-step explanation:

Angles are in the ratio 1:2:3:6

So lets say angles are x, 2x, 3x and 6x

Sum of angles = 360

12x = 360

x = 30

So angles are 30, 60, 90 and 180

This can't be angles of a quadrilateral, as 180 cannot be an angle