| $A$ | $B$ |
| $Q.1. \square ABCD$ is a rectangle then its diagonals $AC$ and $BD$ | $(a)$ bisect each other |
| $Q.2. \square ABCD$ is a parallelogram then its diagonals $AC$ and $BD ...........$ | $(b)$ are congruent and bisect |
| $(c)$ bisect at right angle |
Generate a complete, print-ready paper with questions like this in minutes — across 16+ boards, with answer keys.
| A | B |
| Q.1. ......... tangent / tangents is/are drawn to the circle at any point of the circle. | (a) One |
| Q.2. A circle has ......... tangents. | (b) Two |
| (c) Infinite |
| A | B | |
| $Q.1. CSA$ of cylinder $+\ CSA$ of hemisphere | $(a)$ | $\pi r^2 h$ |
| $Q.2.$ Volume of cone | $(b)$ | $\frac{1}{3} \pi r^2 h$ |
| $(c)$ | $2 \pi r(h+r)$ | |
| $A$ | $B$ |
| $Q.1.$ The length of the semi circle arc is _______ . | $(a) \frac{\pi r^2}{4}$ |
| $Q.2.$ The arc of a circle subtends a right angle at the centre of the circle, then the area of the sector is _________. | $(b)\ 2\ \times$ circum ference |
| $(c) \frac{\text { circumference }}{2}$ |
| $A$ | $B$ |
| $Q.1.$ Find the $HCF$ of $32$ and $33$ | $(a) 1$ |
| $Q.2.$ The product of two consecutive positive integers is always divisible by $......$ | $(b) 2$ |
| $(c) 3$ |
| $A$ | $B$ |
| $Q.1$. Which number is $0.120\ 1200\ 12000\ 120000 ......$ | $(a)5$ |
| $Q.2.$ Write the $HCF$ of $15$ and $51$ | $(b)$irrational |
| $(c)3$ |
| $A$ | $B$ |
| $Q.1.$ If $x + 2y = 5$ and $2x + y = 7$ then $x – y = .....$ | $(a) 2$ |
| $Q.2.$ The standard form of the equation $x-\frac{y}{2}=3$ is $......$ | $(b) 2x – y – 3 = 0$ |
| $(c) 2x – y – 6 = 0$ |
| Section-A | Section-B | |
| $Q.1. \alpha \beta+\beta \gamma+\gamma \alpha$ | $(a)$ | $\frac{-b}{a}$ |
| $Q.2. \alpha \beta \gamma$ | $(b)$ | $\frac{c}{a}$ |
| $(c)$ | $\frac{-d}{a}$ | |
| A | B |
| Q.1. Formula to find the curved surface area of a cone is .......... | (a) $\pi$r (l + r) |
| Q.2. The total surface area of a cone is ......... | (b) $\pi$rl |
| (c) 2$\pi$rl |
| A | B | |
| $Q.1. C.S.A$ of cylinder of $7.cm$ hight | $(a)$ | $\frac{1}{3} \pi r^2 h$ |
| $Q.2.$ Volume of a cone | $(b)$ | $44 r$ |
| $(c)$ | $2 \pi r$ | |
| $A$ | $B$ |
| $Q.1,$ What is the distance of $P(a, b)$ from the origin $?$ | $(a)\sqrt{a^2+b^2}$ |
| $Q.2.$ State the distance formula to find distance between the two points in a plane. | $(b) AB ^2=\left(x_1-y_1\right)^2+\left(x_2-y_2\right)^2$ |
| $(c) AB ^2=\left(x_1-x_2\right)^2+\left(y_1-y_2\right)^2$ |