Question 2 :
Marry put a roast in the oven at $2:45$ P.M. She cooked the roast for $3$ hours $48$ minutes. What time did Marry take the roast out of the oven?
Question 6 :
At 4.24 pm, how many degrees has the hour hand of a clock moved from its position at noon ?<br>
Question 12 :
A clock strikes once at one o'clock, twice at two o'clock, thrice at three o'clock, and so on. How many times, in total, will it strike in 24 hours?
Question 13 :
How many times do the hands of a clock make an angle of 90$^o$ in 36 hours?
Question 14 :
A clock is set to show the correct time at 11:00 a.m. The clock gains 12 minutes in 12 hours. What will be the correct time when the clock indicates 5:30 p.m. the next day?
Question 15 :
What is the angle between the $2$ hands of the clock at $8:24$ pm?
Question 16 :
At what time, between twelve o'clock and one o'clock, will the hands of the clock overlap again?
Question 17 :
There are two clocks, both set to show correct time at 9:00 a.m. One clock loses 1 minute every hour, and the other gains 1 minute every hour. By how many minutes do they differ at 10:00 p.m. on the same day?
Question 18 :
From $6$ am to $6$ pm, the number of times the angle between the two hands of a clock is $\displaystyle { 180 }^{ o }$ is
Question 19 :
Imagine a clock where the hour hand makes only one revolution in 1 day (i.e., 24 hours) whereas the minute hand completes one revolution in 1 hour. What is the angle between the two hands at 14:50 hours <span>as per this clock?</span>
Question 20 :
A certain $12$-hour digital clock displays the hour and minute of a day. Due to a defect in the clock whenever the digit $1$ is supposed to be displayed it displays $7$. What fraction of the day will the clock show the correct time?
Question 21 :
The hands of a clock coincide after every $66$ minutes of correct time. How much is the clock fast <span>or slow in $24$ hours?</span>
Question 22 :
Choose the most appropriate option.<br>The angles between the hands of a clock when the time is $4:25$ am is?<br>
Question 23 :
A clock runs 6 minutes slow per day. By what percentage is it running slow?
Question 24 :
Write the following $24$ hr clock into $12$ hour clock.<br>$23:42$ .
Question 25 :
A person has mistaken the image of a clock in a plain mirror as the clock and read the time as 6:10. What <span>was the correct time?</span>
Question 26 :
A watch which gains uniformly was observed to be 5 minutes slow at 12 noon on a Sunday. On the subsequent <span>Wednesday at 6:00 p.m., it was noticed that the watch was 5 minutes fast. When did the watch show the correct time?</span>
Question 27 :
A clock, which loses 5 minutes per day, is set to show the correct time at 12 noon on a Sunday. What <span>time does the clock show at 12 noon on the next Sunday?</span>
Question 28 :
There are two clocks on a wall, both set right at 10:00 a.m. One clock is losing 2 minutes per hour and the other clock is gaining 3 minutes per hour. If the clock which is losing 2 minutes per hour shows 3:00 <span>p.m. the next day, what time does the clock gaining 3 minutes per hour show?</span>
Question 29 :
A watch showed five past five on Wednesday evening when the correct time was 5:00 p.m. It loses uniformly, and was 5 minutes slow after two days at 7:00 p.m. When did the watch show the correct time?
Question 30 :
At what angle are the hands of a clock inclined at $30$ minutes past $6 $?
Question 31 :
There are two clocks on a wall, both set right at 10:00 a.m. on Sunday. Both the clocks lose 1 minute and <span>2 minute, respectively, every hour. Ifthe clock which loses 2 minutes every hour shows 8:00 p.m. on the following Tuesday, what time does the clock which loses 1 minute every hour show?</span>
Question 32 :
A clock has numbers $1$ to $12$. If a clock has a shape of a circle, then the degree measure made by an arc between any two consecutive numbers of the clock is
Question 33 :
A clock gains 10 minutes in 2 hours. It is set right at 10:I0 a.m. When the clock shows 4:40 p.m. on the same day, what is the correct time?
Question 34 :
A clock is set to show the correct time at 12:00 noon. Immediately, due to some mechanical defect, both the minute hand and the hour hand started moving in the reverse direction (anticlockwise direction). What is the correct time when this clock shows 8:25?
Question 35 :
The minute and hour hands of a clock overlap every 60 minutes of correct time. How much does the <span>clock lose or gain in a day?</span>
Question 36 :
The minute hand of a clock overtakes the hour hand at intervals of 65 minutes. How much in a day does the clock gain or lose?
Question 37 :
A clock loses 5 seconds every hour. If the clock is set on Sunday at 12 noon, then what is the correct time the following Saturday, if the clock shows 12, midnight (give answer to the nearest minute)?
Question 38 :
On a scale of map $1.5 \,cm$ represents $24\, km$. If the distance between two points on the map is $76.5\, cm$, then the actual distance between these points is.
Question 40 :
If a cellphone costs Rs.$999$. What is the cost of $12$ such cellphones?
Question 41 :
How many rational numbers exist between any two distinct rational numbers?
Question 44 : <div>State whether the statement is true or false.</div>$ \displaystyle \frac{4}{-9} $ and $ \displaystyle \frac{-16}{36} $ represent the same rational number?
Question 45 :
Solve it <br/>$\dfrac {\left( {{{\left( {245 + 232} \right)}^2} - {{\left( {245 - 232} \right)}^2}} \right)}{\left( {245 + 232} \right)}$
Question 47 :
$\frac {171\tfrac {3}{4}\times 171\tfrac {3}{4}-91\tfrac {3}{4}\times 91\tfrac {3}{4}}{171\tfrac {3}{4}+91\tfrac {3}{4}}$ is equal to
Question 51 :
$\displaystyle 40- \frac { 1 }{ 2 }\times ........ = 1 $
Question 53 :
The value of $0.\bar { 1 } +0.0\bar { 1 } +0.00\bar { 1 } $ is equal to
Question 55 :
Rosy measured a line for his art project. It is $400$ millimeters long. How many centimeters is the line?
Question 56 :
A conical cup 36 cm high has diameter of base 28 cm It is full of water. The water was poured into a cylindrical jar of radius of base 10 cm. The height of water in the vessel is
Question 58 :
Jessica walks $2\ km$ a day. How many meters does she walk in two days ?
Question 59 :
Gabriel watched $3$ old movies on videotape. The first movie was $62$ minutes long. The<br/>second was $1$ hour $34$ minutes long. The third was $1$ hour $25$ minutes long. He started<br/>watching at $3:15$ P.M. At what time did the last movie end?
Question 60 :
Simplify : $4 \times 4 - 2 \times 3 + 16 + 4 =$
Question 63 :
A wire is looped in the form of a circle of radius 28 cm. It is re-bent into a square form. Determine length of the side of the square.
Question 65 :
Vineet packed $\dfrac {3}{4} kg$ of sugar each into $42$ plastic bags. Find the total weight of sugar Vineet packed.
Question 71 :
One inch is equivalent to $2.54$ cm. How many centimeters are in two feet? Round your answer to two decimal places.
Question 74 :
A right circular cylinder and a sphere are of equal volumes and their radii are also equal If h is the height of the cylinder and d is the diameter of the sphere then
Question 75 :
The ratio at which the point $(5,4)$ divides the line $(3,2)$ and $(8,7)$
Question 76 :
A copper sphere of diameter 6 cm is drawn into a wire of diameter 0.4 cm. The length of the wire is
Question 77 :
If Harry runs $23\ m\ 5\ cm$ and Joy runs $14.37\ m$ from the same starting point, then how far is Joy from Harry.
Question 78 :
Mark against the correct answer in each of the following:<br>$ 6 cm =? $
Question 79 :
A pole is painted yellow and black. The yellow part is $1.8\ m$ long and the black is three times longer than yellow part. Find the length of pole.
Question 80 :
Diameter of a copper sphere is 6 cm. The sphere is melted and drawn into a wire of uniform circular cross section which is 72 cm long .The diameter of the wire is nearly
Question 81 :
There is a rod of length $4\ cm$ and another rod of length $500\ mm$ has been joined to the first rod. Then the length of the rod(in cm) formed by joining these $2$ is :
Question 82 :
Mark against the correct answer in each of the following:<br>$ 2 km \quad 5 m = ? $
Question 83 :
Rita had $\displaystyle 38\frac { 1 }{ 4 } $ m long rope. She cut it into 5 equal parts. Then the length of each piece will be-
Question 84 :
Mr Sahoo attended a 1-day workshop from 09:15 a.m. to half five in the evening. The workshop included a $1\frac{1}{4}$ hour lunch break, two 15 minutes tea breaks and 13 activities, each of equal duration. Calculate the duration of each activity.
Question 87 : Simplify the following :<div>$0.4 \times \displaystyle \frac{7}{3} \div \frac{15}{8} $ of $ \left ( \dfrac{7}{5} - \dfrac{4}{3} \right )$.<br/></div>
Question 88 :
Rekha started her homework at $1:59$ pm point<span> and finished her homework $96$ minutes later. Rekha</span><span> had volleyball practice at $4:00$ pm. How much time(in minutes) did Susan have between finishing her homework and the beginning of volleyball.</span>
Question 92 :
Expenditure incurred in cultivating a square field at the rate of Rs. $170$ per hectare is Rs. $680$. What would be the cost of fencing the field at the rate of Rs. $3$ per meter?
Question 95 :
What should be subtracted from $ 0.1 $ to get $ 0.03? $<br>
Question 96 : Match the following.<table class="wysiwyg-table"><tbody><tr><td>Column I</td><td>Column II</td></tr><tr><td>(i) $715+12.59+685.35=$</td><td>(P) $417.16$</td></tr><tr><td>(ii) $518-( 216.80 -115.96 )=$</td><td>(Q) $213.07$</td></tr><tr><td>(iii) $4.090+0.050+6.500=$</td><td>(R) $1412.94$</td></tr><tr><td>(iv) $36.050+198.05-21.03=$</td><td>(S) $10.640$</td></tr></tbody></table>
Question 105 :
A shopkeeper sold $12.750$ kg of sugar on a day. On the next day he sold $38.250$ kg of sugar. On the third day he sold $50.500$ kg of sugar. How much of sugar in all did the shopkeeper sell ?
Question 106 :
The base of the decimal number system is ten, meaning, for example, that 123=1.10$^{2}$ + 2.10 + 3. <br>In the binary system, which has base two, the first five positive integers are 1,10,11,100,101. The numeral 10011 in the binary system would then be written in the decimal system as:
Question 107 :
Which pair of operations will make the equation below true when inserted into the blank spaces in the order shown? $\displaystyle 2\frac{3}{10} $ ___ $1.5$ ____ $2=1.8$
Question 108 :
Mark against the correct answer in each of the following:<br>$ ( 1.007 - 0.7) = ? $<br><br>
Question 110 :
A person bought $32$L of water for the football game and he divided the water equally into $8$ cooler. Find the quantity of water in each of the coolers by converting it into millilitres.
Question 111 :
In the expression $24 - [ 2.4 - \{ 0.24 - (0.024 - x)\}] = 21.8184$,<b> </b>the value of x is <br/>
Question 112 : If $1.8 - 6.3x = -0.3x$, then find the value of $x$ is<div><br/></div>
Question 113 :
State the following statement is True or False<br/>$891$ cm can also be written as $89$ m $3$ cm
Question 114 :
What should be added to $ 3.07 $ to get $ 3.5? $
Question 115 :
Capacity of measuring flask is $1$ litre.What it will be in cubic centimeter $?$
Question 117 :
Golu's toothbrush is $14.5\ cm$ long and Samaksh's toothbrush is $12.8\ cm$ long. How much longer is Golu's toothbrush than Samaksh?
Question 119 :
If k is an integer and $\displaystyle \left( 0.0025 \right) \left( 0.025 \right) \left( 0.00025 \right) \times { 10 }^{ k }$ is an integer, what is the least possible value of k ?
Question 123 :
Lakshmi is $150$ cm tall. What is her height in meters ?
Question 127 : The charges in a resort are shown.<br/>Mr. Mohit drove to the resort with his wife and three children on Saturday at $1:30$p.m. They left the resort at $8$ p.m. How much did Mr. Mohit and his family have to pay in all?<table class="wysiwyg-table"><tbody><tr><td>Entrance Fee</td><td>Rs. $40$ per car</td></tr><tr><td>Monday to Friday</td><td>Rs. $15.50$ per passenger</td></tr><tr><td>Saturday and Sunday</td><td>Rs. $22.50$ per passenger</td></tr><tr><td>Parking charges</td><td>Rs. $10.60$ per half hour</td></tr></tbody></table><br/>
Question 128 :
Frank the Fence maker needs to fence in a rectangular yard. He fences in three of the four sides of the yard. The unfenced side of the yard is 40 feet long. The yard has an area of 280 square feet. What is the length, in feet, of the fence that Frank installs?
Question 129 : <div><span>Give possible expressions for the length and breadth of the following rectangle, in its area is given:</span><br/></div>$Area: 25a^2-25a+12$<br/>
Question 130 :
A garden is $24\ m$ long and $14\ m$ wide. There is a path $1\ m$ wide outside the garden along its sides. If the path is to be constructed with square marble tiles $20\ cm\, \times\, 20\, cm$, then how many number of tiles will be require to cover the path ?
Question 131 :
The perimeter of a rectangular plot is $48$ m and its area is $108\ \text{ m }^{ 2 } $. The dimensions of the plot are
Question 132 :
The area of a rectangle is $650\ cm^2$ and its breadth is $13\ cm$. The perimeter of the rectangle is
Question 134 :
A wire is in the form of a circle of radius 28 cm, then the side of the square into which it can be bent is
Question 135 : A former has decided to build a wire fence along one straight side of his property. For this, he planned to place fence-posts at 6 m intervals, with posts fixed at both ends of the side. <div>After he bought the posts and wire, he found that the number of posts he had bought was 5 less than required. However, he discovered that the number of posts he had bought would be just sufficient if he spaced them 8 m apart. </div><div><span>What is the length of the side of his property and how many posts did he buy?</span><br/></div>
Question 136 :
A square field of area $31684$ sq.mts is to be enclosed with wire placed at heights $1, 2, 3, 4$ mts above the ground. What length of the wire will be required, if its length required for each circuit is $5\%$ greater than the perimeter of the field?
Question 137 :
Perimeter of a regular octagon of side $6\ cm$ is $36\ cm$.
Question 138 :
A playground which is $ 250$ m long and $20$ m broad is to be fenced with wire. How much wire is needed?
Question 139 :
When each side of a particular square is lengthened by $2$ inches, the area of the square increases by $32$ square inches. Calculate the length of sides of original square(in inches).
Question 140 :
In a rectangle, the difference between the sum of the adjacent sides and the diagonal is half of the longer side. What is the ratio of the shorter side to the longer side?
Question 141 :
The side of a square is 2 cm. Semicircles are constructed on two sides of the square, then the area of the whole figure is <br>
Question 142 :
The opposite pairs of sides of a square are increased by $40$% and $30$% respectively. The area of the resulting rectangle exceeds the area of the square by
Question 143 :
The matchbox measures $4$ cm $ \times $ $2.5$ cm $ \times $ $1.5$ cm.What is the volume of a packet containing $12$ such matchboxes?
Question 144 :
The rate for a $1.2$ m wide carpet is Rs. $40$ per metre; find the cost of covering a hall $45$ m long and $32$ m wide with this carpet. Also, find the cost of carpeting the same hall if the carpet, $80$ cm wide, is at Rs. $25$ per metre.
Question 145 :
Of the two square fields, the area of one is $1$ hectare while the other one is broader by $1%$. The difference in their area is,
Question 146 :
Find the perimeter of a square of length $25 \,cm$ .
Question 147 :
A rectangular field is to be fenced on three sides leaving a side of $20\ m$ uncovered. If the area of the field is $680\ m^2$, how many metres of fencing will be required.
Question 148 :
The area of a playground is $1600$ square metres. What is its perimeter?<br/>(I) <span>It is a perfect square playground<br/>(II) It costs Rs. $3200$ to put a fence around the play ground <span>at the rate of Rs. $20$ per metre</span></span>
Question 149 :
The perimeter of a square is ____ times the length of the side.<br/>
Question 150 :
What is the perimeter of a rectangle with length $=4\ cm$ and breadth $=2\ cm$?
Question 151 :
The length of a rectangle is $3$ times its breadth, if the length is decreased by $3$ cm and the breadth increased by $5$ cm the area of the rectangle is increased by $57$ $\displaystyle cm^{2}$ The perimeter of the rectangle is
Question 152 :
A pentagonal prism has $15$ edges. How many vertices does it have ?
Question 153 :
The perimeter of a scalene triangle and isosceles triangle and an equilateral triangle are equal Which triangle can have more area?
Question 154 :
If the length of a rectangular plot of land is increased by $5 \%$ and the breadth is decreased by $10 \%$, how much will its area increase or decrease?
Question 156 :
The perimeter of a rectangle, $(16x^3-6x^2+12x+4)$. If one of its sides is $(8x^2+3x)$, then the other side is
Question 157 :
Two sides of a triangle are $13\ cm$ and $14\ cm$ and its semi-perimeter is $18\ cm$. Then third side of the triangle is<br/>
Question 158 :
Find perimeter of a square if its diagonal is $16\sqrt {2}\ cm$.
Question 159 :
A square of side $x$ is taken. A rectangle is cut out from this square such that one side of the rectangle is half that of the square and the other is $\displaystyle \frac{1}{3}$ the first side of the rectangle. What is the area of the remaining portion?
Question 160 :
The number of square in tin sheets of side 20 cm that can be cut off from a square tin of side 1 m, is
Question 161 :
If the diagonal of a square is $12\sqrt{2}$ cm, then the perimeter of square is ____
Question 162 :
You need to take $n$ arbitrary points on or inside a square of side $2cm$ that there will always be a pair of points at a distance of not more than $\sqrt{2}cm$. What is the minimum value of $n$?
Question 163 :
The maximum area of the rectangle that can be inscribed in a circle of radius 2 units is _____.<br>
Question 164 :
The lateral surface area of a hollow cylinder is $5632 cm^{2}$. It is cut along its height and rectangular sheet of width $44 cm$ is formed. Find the perimeter of the rectangular sheet?
Question 165 :
A square and a rectangle have same perimeter. The side of square is $40$ cm and length of rectangle is $10$ cm, find breadth of rectangle.
Question 166 :
The perimeter of a square is $48\ m$. The area of a rectangle is $4\ sq. m$ less than the area of given square. If the length of the rectangle is $14\ m$, then its breadth is equal to
