Question:

Level 1

In the figure, AB, CD and EF are straight lines. ∠COE = 65° and ∠BOD = 29°. Find ∠AOF.

In the figure, AB, CD and EF are straight lines. ∠COE = 65° and ∠BOD = 29°. Find ∠AOF.

1 m

Level 1

In the figure, not drawn to scale, PQRS is a rhombus. ∠QSP is 53°. RST is a straight line. Find ∠PST.

In the figure, not drawn to scale, PQRS is a rhombus. ∠QSP is 53°. RST is a straight line. Find ∠PST.

2 m

Level 2

In the figure, UOV and SOT are straight lines. What is the sum of ∠SOP and ∠VOP?

In the figure, UOV and SOT are straight lines. What is the sum of ∠SOP and ∠VOP?

2 m

Level 2

The figure shows an isosceles triangle. What is the value of ∠q?

The figure shows an isosceles triangle. What is the value of ∠q?

2 m

Level 2

In the figure, ABCD is a rectangle and BDE is an isosceles triangle. Given that ∠BEC = 65°, find ∠DBE.

In the figure, ABCD is a rectangle and BDE is an isosceles triangle. Given that ∠BEC = 65°, find ∠DBE.

2 m

Level 2

In the figure, KJN is a straight line. LMJ is an isosceles triangle and KJL is an equilateral triangle. Find ∠OJN.

In the figure, KJN is a straight line. LMJ is an isosceles triangle and KJL is an equilateral triangle. Find ∠OJN.

2 m

Level 1

In the figure, ABCD and CDEF are two identical parallelograms. Find

In the figure, ABCD and CDEF are two identical parallelograms. Find

- ∠m
- ∠n

2 m

Level 2

In the figure, QWR, SWT and UWV are straight lines. ∠x is half the size of ∠y and ∠SWV is 123°. Find ∠x.

In the figure, QWR, SWT and UWV are straight lines. ∠x is half the size of ∠y and ∠SWV is 123°. Find ∠x.

2 m

Level 2

The figure is made up of 2 squares. ∠ABX = 35° and ∠EBY = 50°. Find ∠XBY.

The figure is made up of 2 squares. ∠ABX = 35° and ∠EBY = 50°. Find ∠XBY.

2 m