## Question 1

How many sides has regular polygon having one of its interior angles as 150^{o}

Maths is funny

loading...

How many sides has regular polygon having one of its interior angles as 150^{o}

How many sides has a regular polygon whose interior angle is 135^{o} each

How many sides has regular polygon having one of its interior angles as 150^{o}

From the figure above, what is the value of *p*

In the figure above, $KL\parallel NM$, *LN* bisect $\angle KNM$. If angle KLN is 54^{o} and angle MKN is 35^{o}. Calculate the size of angle

How many sides has regular polygon whose interior angle is 135^{o} each

$\begin{align} & \text{If the angle of a quadrilateral are }{{(3y+10)}^{\circ }},\text{ }{{(2y+30)}^{\circ }},{{(y+20)}^{\circ }}\text{ and }4{{y}^{\circ }},\text{ } \\ & \text{Find the value of }y\text{ } \\ & \text{(A) 1}{{\text{2}}^{\circ }}\text{ (B) 3}{{\text{0}}^{\circ }}\text{ (C) 4}{{\text{2}}^{\circ }}\text{ (D) 6}{{\text{6}}^{\circ }} \\\end{align}$

The value of *x* in the figure above is

In the diagram above, find the value of *x*

In the diagram above OR$\parallel $TU, $\angle PQR={{80}^{\circ }}$,and $\angle PSU={{95}^{\circ }}$Calculate $\angle SUT$