Question 3 :
The rational number which can be expressed as a terminating decimal is
Question 5 :
If $\sqrt { 3\sqrt { 3\sqrt { 3\sqrt { 3\sqrt { 3 } } } } } ={ 3 }^{ n }$ find the value of $n$
Question 6 :
Suppose ${ 4 }^{ a }=5,{ 5 }^{ b }=6,{ 6 }^{ c }=7,{ 7 }^{ d }=8$, then the value of $abcd$ is ?
Question 7 :
An angle is $45^o$ less than two times of its supplement, then the greater angle is ___________.
Question 8 :
An angle which is more than  $\displaystyle 180^{0}$ and less than $\displaystyle 360^{0}$ is called
Question 9 :
The angles of a triangle are in the ratio 2: 1: 3. Is the triangle right-angled triangle,
Question 10 :
If the sum of two adjacent angles is $100^{\circ}$ and one of them is $35^{\circ}$, then the other is :<br>
Question 12 :
Assertion: If two lines intersect, then the vertically opposite angles are equal.
Reason: If a transversal intersects, two other parallel lines, then the sum of two interior angles on the same side of the transversal is $180^o$.
Question 15 :
Mark the correct alternative of the following.<br>If the measures of the angles of a triangle are $(2x-5)^o, \left(3x-\dfrac{1}{2}\right)$ and $\left(30-\dfrac{x}{2}\right)$, then $x=?$<br>
Question 16 :
Find smallest of two supplementary angles, if they are in the ratio $7 : 11$.
Question 17 :
If $\displaystyle \Delta ABC$ and $\displaystyle \Delta XYZ$ are congruent, then $\displaystyle \Delta ABC ....... \Delta XYZ.$
Question 18 :
In a triangle $ABC$, $\overline{AB} \cong \overline {AB}$ is a _________ property of congruence.<br/>
Question 20 :
Two plane figures are said to be congruent if they have_____.
Question 21 :
Find all possible lengths of the third side, if sides of a triangle have $3$ and $9$.<br/>
Question 22 :
The construction of a triangle $ABC$, given that $BC =$ $6$ cm, $B =$ $45 ^{\circ}$ is not possible when difference of $AB$ and $AC$ is equal to:<br/>
Question 24 :
<p></p><p>Two line segments are congruent if they have the same length.<br/></p><p></p>
Question 25 :
In $\Delta ABC, \angle A= 30^o , \angle B=40^o $ and $\angle C=110^o$ <br/>In $\Delta PQR, \angle P= 30^o , \angle Q=40^o $ and $\angle R=110^o$ <br/>Then Is $\Delta ABC \cong \Delta PQR$ by AAA ?<br/>
Question 26 :
The graph of the equation $y = a$ is a straight line parallel to _____
Question 27 :
Distance of the line $x=64$ from the $y$ axis is _____ units
Question 28 :
$x = 2, y = -1$ is a solution of the linear equation
Question 29 :
Which of the following is a solution of the equation 4x + 3y = 16?
Question 30 :
Consider the equation:<br/>$\displaystyle y+7x=3x-2y+28$<br/>If $y = 2$, what is the value of $x$?
Question 32 :
The coordinates of point lying on $X$-axis and its distance from +ve Y-axis $3$ is
Question 33 :
If $P (-2, 2), Q (3, -3), R (1, -1), S (-2, -3)$ and $T (-5, 5)$ are plotted on the graph paper, then the points in the $IV$ quadrant are
Question 34 :
Write whether the following statements are True or False ? Justify your answer.<br>Point $\left(3,0\right)$ lies in the first quadrant.
Question 36 :
State True or False.The point $(-x, -y)$ lies in the first quadrant where x < 0, y < 0.
Question 37 :
One side of an equilateral triangle is 8 cm. Its area is
Question 38 :
The three sides of a triangle are $3cm,4cm$ and $5cm$ respectively; then its area is:
Question 39 :
The sides of a triangle are $4, 5$ and $6$ cm. The area of the triangle is equal to
Question 40 :
The ratio of the area of a square of side $a$ and equilateral triangle of side $a$, is
Question 41 :
Find the area of a triangle whose sides are respectively $150$ cm, $120$ cm and $200$ cm. 
Question 42 :
The area of an isosceles triangle having base 2 cm and the length of one of the equal sides 4 cm, is<br>
Question 43 :
Find the area of a triangle with sides having length $40, 24$ and $32 m$
Question 44 :
A triangle and a parallelogram have the same base and the same area. If the side of the triangle are 13 cm, 14 cm, and 15 cm and the parallelogram stands on the base 14 cm, find the height of the parallelogram.
Question 45 :
The opposite sides of a parallelogram are represented by $3x + 12$ and  $5x - 20$. Find the length of the side of the parallelogram represented by $2x - 5$.<br/>