Question 1 :
If the circumference and the area of a circle are numerically equal, then what is the numerical value of the diameter?
Question 2 :
The radius of a circle is increased by 1 cm. Then the ratio of new circumference to the new diameter is
Question 3 :
The circumference and area of a circle of radius 17.5 cm are, respectively
Question 4 :
What is the circumference of a circle whose radius is 8 cm?
Question 5 :
The radius of a circle is $20 cm$. If more concentric circles are drawn inside it in such a manner that it is divided into 4 equal parts, find the radius of the smallest circle.
Question 6 :
The difference in the area of a square of perimeter $88$ m and a circle with same circumference is
Question 7 :
A circular wire of radius 1 dm is cut and is placed along the circumference of a circle of radius of one meter The angle subtended by the wire at the centre of the circle is equal to
Question 8 :
Let circumference of a circle is $S$ and area of the circle is $A$. Then which of the following is true.
Question 9 :
If $ABCD$ is a parallelogram then the ratio of the areas of parallelogram $ABCD$ and $\displaystyle \Delta ABC$ is
Question 10 :
A dairy farm covers an area of $8\ km^{2}$. What is the area of the farm in hectares?
Question 11 :
The area of a right angle triangle is$ \displaystyle 20cm ^{2} $ and one of the sides containing the right triangle is 4 cm Then the altitude on the hypotenuse is
Question 12 :
The cost of leveling a circular field at $Rs. 2$ per sq. metre is $Rs. 33957$. Calculate the area of the field.
Question 13 :
Choose the correct answer from the alternative given.<br/>A can go round a circular path $8$ times in $40$ minutes. If the diameter of the circle is increased to $10$ times the original diameter, the time required by A to go round the new path once travelling at the same speed as before is:
Question 14 :
There is a rectangular tank of length $180m$ and breadth $120 m$ in a circular field, if the area of the land portion of the field is $40000m^{2}$, what is the radius of the field?
Question 15 :
If a circle is divided into two equal parts, then equal part of the circle is called ________.
Question 16 :
The area of parallelogram if the base is $36cm$  and height is $45cm$
Question 17 :
If the area of a circle is $346.5 \displaystyle cm^{2}$. Its circumference is
Question 18 :
What is the perimeter of right angled triangle with the length of perpendicular sides $2\ m$?<br><br>
Question 19 : Find the values of P, Q, R and S.<br><table class="wysiwyg-table"><tbody><tr><td>Length of rectangle (cm)</td><td>Breadth of rectangle (cm)</td><td>Area $(cm^2)$</td><td>Perimeter (cm)</td></tr><tr><td>25</td><td>P</td><td>300</td><td>Q</td></tr><tr><td>18</td><td>R</td><td>S</td><td>66</td></tr></tbody></table>
Question 20 :
To find the cost of painting a wall we need to find the perimeter of the wall.
Question 21 :
The lengths of two sides of a right angles triangle which contain the right angle are 'a' and 'b' respectively. Three squares are drawn on the three sides of the triangle on the outer side. What is the total area of the triangle and the three squares?
Question 23 :
The base of a right angled triangle is 8 m and its hypotenuse is 10 m Then its area is
Question 24 :
One side of a parallelogram is $8$ cm. If the corresponding altitude is $6$ cm, then its area is given by<br/>
Question 25 :
One side of a parallelogram is 8 cm. If the corresponding altitude is 6 cm, then its area is given by
Question 26 :
The area of a rectangle is same as that of a circle of radius $\displaystyle\sqrt{\frac{35}{11}}$cm. If the length of the rectangular exceeds its breadt by $3$cm., then the length of the rectangular is
Question 27 :
The side of an equilateral triangle is $0.5$ cm. The perimeter of the triangle is  
Question 28 :
In a trapezium whose parallel sides measure 12 cm and 10 cm and the distance between them is 8 cm. Find the area of trapezium---
Question 29 :
A roller of diameter 70 cm and length 2m is rolling on the ground What is the area covered by the roller in 50 revolutions?
Question 30 :
Deepika bought 7 packets of milk. Each packet contained 0.45 L of milk. How much milk did she buy altogether?
Question 31 :
$ABC$ is a triangle such that $AB=10$ and $AC=\,3$. The side $BC$ is:
Question 32 :
State true or false:The area of $\triangle XYZ$ in which $XY=YZ=ZX =4.5$ cm is $8.77$ $cm^2$, approximately.
Question 33 :
The length of minor arc $\widehat {AB}$ of a circle with radius $7$ units  is $14$. Find the length of major arc $\widehat {AB}$.
Question 34 :
A cow is tied at the corner of a square field with 21 m long rope. The side of the square is 25 m The area of the field on which the cow cannot graze is
Question 35 :
A square of side 16 cm is reduced by a scale factor 0.5 Find the area of the image<br>
Question 36 :
The circumference of a circle is 3.14 m Its area will be equal to -
Question 37 :
If the ratio of the sides of two triangles is 2: 3, then the ratioof their areas is
Question 38 :
Find the circumference of the circle with the following radius : 10 cm
Question 39 :
Find the area of the parallelogram whose base is $17\ cm$ and height $0.8\ m$?
Question 40 :
The radius of a circular field is $210$ m. The cost of fencing its circumference at the rate of Rs.$1.25$ per metre is
Question 41 :
State true or false:The area of $\triangle ABC$ in which $AB=BC=4 cm$ and ${\angle ABC= 60 ^{0}}$ is $6.93 cm^2$, approximately.
Question 42 :
The.perimeter of an isosceles triangle is $32 cm$. The ratio of the equal side to base is $3 : 2$. Find the area of the triangle.
Question 43 :
If the area of a parallelogram is $144 \operatorname { cm } ^ { 2 }$ and its base is $9 cm$. then its height is 
Question 44 :
The radius of a wheel is $0.25 m$. How many rounds will it take to complete the distance of $11 km$?
Question 45 :
The circumference of a circle exceeds its diameter by $180$ cm. Then the radius is equal to
Question 46 :
The area of a rectangle is 15 square centimeters and the perimeter is 16 square centimeters. What are the dimensions of the rectangle? <br/>
Question 47 :
A designated swimming pool of a circular pond at a park is marked with two ropes attached to a buoy at the center of the pond. Each rope is $10$ yards long, and together they form an angle of $160^o$. What is the approximate area of the sector that is designated for swimming pole?
Question 49 :
A chess-board contains $64$ equal squares and the area of each square is $6.25 cm^2$. And inside border around the board is $2$ cm. wide. The length of the chess-board is
Question 50 :
Choose the correct answer from, the given four options:<br>If the area of a square is numerically equal to its perimeter, then the length of each side is<br>
Question 51 :
Samuel wanted to implant some vertical stones along the boundary of his plot at a distance of $10$ m each. If length-of-the plot is $30$ m and the breadth is $15$ m, then the number of stones used is:
Question 52 :
A square and an equilateral triangle triangle have equal perimeters. If the diagonal of the square is $12\sqrt{2}$ cm, then area of the triangle is
Question 53 :
If the length of a rectangle is two times its breadth and area is $228{cm}^{2}$, then length and breadth are respectively ________ .
Question 54 :
If an equilateral triangle of area $X$ and a square of area $Y$ have the same perimeter, then $X$ is:
Question 55 :
From a circle of radius 7 cm the largest possible square is cut and removed Find the area of the remaining portion (in cm$\displaystyle ^{2}$)
Question 56 :
A piece of wire in the form of a rectangle $15\space cm$ long and $7\space cm$ broad is reshaped and bent into the form of a circle. Find the radius of the circle.
Question 57 :
The hypotenuse of a right angled triangle is $10\space cm$ and the radius of its inscribed circle is $1\space cm$. Therefore, perimeter of the triangle is
Question 58 :
Two sides of a triangle are $13 cm$ and $14 cm$ and its semi-perimeter is $18 cm$. Then, the third side of the triangle is:<br/>
Question 59 :
The length and breadth of a rectangular field are $260m$ and $130m$ respectively, then its area (in hectares) is ______ .
Question 60 :
The perimeter of an equilateral triangle and a square are same then $\displaystyle \frac{area\,  of \Delta }{are\, of\ \square }=$
Question 61 :
An equilateral triangle has area $A\sqrt3$. Three circles are drawn with their centres at the vertices of the triangle. Diameter of each circle is equal to the length of each side of the triangle. The area of the triangle NOT included in any of the three circles is
Question 62 :
If the length of circumference of a circle is $60$cm more than its diameter, then length of its circumference is?
Question 63 :
The length of a rectangular hall is $5$ metres more than its breadth. If the breadth of the hall is $25$ metres, then the area of the hall is _________ .
Question 64 :
A square and a regular hexagon have equal perimeters. Their areas are in the ratio:
Question 65 :
A square and a rectangular plot of land have same perimeter. If the square is of side $40m$ and rectangle is of length $5$ decameter. Then area of rectangle is _______ .
Question 66 :
The length of a rectangle is $\left( \cfrac { 6 }{ 5 } \right) $th of its breadth. It its perimeter is $132m$, its area will be ______ .
Question 67 :
The area of a rectangle whose length is $5$ units more than twice its width is $75$ square units. What is its width?
Question 68 :
The perimeter of the rectangle and square are same. Length and breadth of the rectangle are $10cm$ and $8cm$ respectively. What is the area of the square?
Question 69 :
The perimeter of circle is $\displaystyle \pi $ cm, then the area<br>
Question 70 :
A drinking glass is in the shape of a frusturm of a cone of height 14 cm. The diameter of its two circular ends are 4 cm and 2 cm then the capacity glass is -
Question 71 :
The length of a rectangular garden is $2$ feet longer than $3$ times its width. If the perimeter of the garden is $100$ feet, find the width of the garden.
Question 72 :
A regular hexagon of maximum possible area is cut off from an equilateral triangle. The ratio of area of triangle to the area of hexagon will be
Question 73 :
Circule of unit radius is in a rectangle of length  and $10\pi $m width $2\pi $ metres. The area of the remaining portion except the circle is:
Question 74 :
The number of marble slabs of size $20\ cm \times 30\ cm$ required to pave the floor of a square room of side 3 metres is
Question 75 :
Length and breadth of a rectangle are 3.2 m and 150 cm Then the area is<br>
Question 76 :
An equilateral triangle and a square have equal perimeters. If side of the triangle is $9.6\ cm$; what is the length of the side of the square ?
Question 77 :
If an area enclosed by a circle or a square or an equilateral triangle is the same, then the maximum perimeter is possessed by:
Question 78 :
Find the area of a circular park whose circumference is $22$m.
Question 79 :
The length of the diagonal of a quadrilateral is $40\;cm$ and the perpendicular drawn to it from the opposite vertices are $12\;cm\;and\;7.5\;cm$. Find the area of the quadrilateral.
Question 80 :
A horse is placed for grazing inside a square field 12 cm long and is tethered to one corner by a rope 8 cm long. The area it can graze is
Question 81 :
$A$ took $15$ seconds to cross a rectangular field diagonally walking at the rate of $52$ m/min and B took the same time to cross the same field along its sides, walking at the rate of $68$ m/min. The area of the field is: 
Question 82 :
The ratio of the radius of two sphere is 3 : 2 Then the ratio of their surface area is <br>
Question 83 :
The total cost of flooring a room at Rs.$8.50$ per sq. metre is Rs.$510$. If the length of the room is $8$ metres, find its breadth.
Question 84 :
A rectangular field has a length $10$ feet more than it is width. If the area of the field is $264$, what is the width of the rectangular field?<br/>
Question 85 :
The produce of a square field when sold at therate of Rs. 1.50 per 100 sq. metres fetchesRs. 1350. What will be the cost of putting afence all round the field at the rate of 50 paiseper metre?
Question 86 :
The side of a square is $2 cm$ and semicircles are constructed on each side of the square, then the area of the whole figure is
Question 87 :
The dimension of a rectangular court is such that if the length were increased by $2$ metres and the breadth diminished by the same, its area would be diminished by $12$ square metres, and if the length were increased by $2$ metres and its breadth increased by the same. Its area would be increased by $44$ square metres. Find the length.
Question 88 :
Find the area of a triangle ABC whose vertices are A(-2 ,2) B(5 ,2) and whose centroid is (1 , 3)
Question 89 :
A parallelogram has sides $30 m, 70 m$ and one of its diagonals is $80 m$ long. Its area will be
Question 90 :
The perimeter of sheet of paper in the shape of a quadrant of a circle is 25 cm then area of the paper is <br>
Question 91 :
The diameters of two wheels are $10$ in. and $14$ in. The smaller makes $50$ more revolutions than the larger in going a certain distance. This distance, in inches, is
Question 92 :
The perimeter of a sector is a constant. If its area is to be maximum, then the sectorial angle is
Question 93 :
A triangular park in a city has dimensions $100 m \times 90 m \times 110 m$. A contract is given to a company for planting grass in the park at the rate of $Rs. 4000$ per. hectare. Find the amount to be paid to the company. (Take $\sqrt 2  = 1.414$) (1 hectare $= 10,000 m^2$)
Question 94 :
The perimeter of an isosceles triangle is $32cm$ and each of the equal sides is $5/6$ times of the base. What is the area (in ${cm}^{2}$) of the triangle?
Question 96 :
A circle of radius x has an area twice that of a square of side a. The equation used to find the radius ofthe circle is
Question 97 :
If circle R, of area 4 square inches, radius of circle S is twice of circle R, then the area of circle S, in square inches, is
Question 98 :
A plot of land is in the shape of a right angled isosceles triangle. The length of the hypotenuse is $50\sqrt{2}\ m$. The cost of fencing it at Rs. $3$ per mete will be
Question 99 :
Find the area of the circle if the area of an isosceles right triangle inscribed in it is 18 $\displaystyle cm^{2}$
Question 100 :
A boy walks diagonally across a square lot. What percent does he save by not walking along the edges(approximately)?
