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5081
CAT 2002 | Question: 99
A boy is supposed to put a mango into a basket if ordered $1,$ an orange if ordered $2$ and an apple if ordered $3.$ He took out $1$ mango and $1$ orange if ordered $4.$ he was given the following sequence of orders $12332142314223314113234$ At the end of the sequence, what will be the number of oranges in the basket? $2$ $3$ $4$ $6$
A boy is supposed to put a mango into a basket if ordered $1,$ an orange if ordered $2$ and an apple if ordered $3.$ He took out $1$ mango and $1$ orange if ordered $4.$ ...
go_editor
13.9k
points
1.1k
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
quantitative-aptitude
cat2002
permutation-combination
+
–
0
votes
0
answers
5082
CAT 2002 | Question: 98
In a book store, each of the word of the glowsign board “MODERN BOOK STORES” is visible after $5/2, 17/4$ and $41/8$ seconds respectively. Each of them is put off for $1$ second. Find the time after which one person can see a completely visible glowsign board. $73.5$ seconds $79.4$ seconds $68.2$ seconds None of these
In a book store, each of the word of the glowsign board “MODERN BOOK STORES” is visible after $5/2, 17/4$ and $41/8$ seconds respectively. Each of them is put off for...
go_editor
13.9k
points
855
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
lcm-hcf
+
–
0
votes
0
answers
5083
CAT 2002 | Question: 97
There is a tunnel connecting city $\text{A}\; \&\;\text{B}.$ There is a CAT which is standing at $\frac{3}{8}$ the length of the tunnel from $\text{A}.$ It listens a whistle of the train and starts running towards the entrance where, the train and the CAT ... and the train again met the CAT at the exit. What is the ratio of their speeds? $4:1$ $1:2$ $8:1$ None of these
There is a tunnel connecting city $\text{A}\; \&\;\text{B}.$ There is a CAT which is standing at $\frac{3}{8}$ the length of the tunnel from $\text{A}.$ It listens a whis...
go_editor
13.9k
points
448
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
speed-distance-time
+
–
0
votes
0
answers
5084
CAT 2002 | Question: 96
If $pqr=1$ then $\frac{1}{1+p+r^{-1}} + \frac{1}{1+q+r^{-1}} + \frac{1}{1+r+p^{-1}} $ is equivalent to $p+q+r$ $\frac{1}{p+q+r}$ $1$ $p^{-1}+q^{-1}+r^{-1}$
If $pqr=1$ then $\frac{1}{1+p+r^{-1}} + \frac{1}{1+q+r^{-1}} + \frac{1}{1+r+p^{-1}} $ is equivalent to$p+q+r$$\frac{1}{p+q+r}$$1$$p^{-1}+q^{-1}+r^{-1}$
go_editor
13.9k
points
470
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
algebra
+
–
0
votes
0
answers
5085
CAT 2002 | Question: 95
Three small pumps and one additional pump are filling a tank. Each of the three small pumps works at $2/3$ rd the rate of the large pump. If all $4$ pumps work at the same time, then they should fill the tank in what function of time that it would have taken the large pump alone? $4/7$ $1/3$ $2/3$ $3/4$
Three small pumps and one additional pump are filling a tank. Each of the three small pumps works at $2/3$ rd the rate of the large pump. If all $4$ pumps work at the sam...
go_editor
13.9k
points
329
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
work-time
pipes-cistern
+
–
0
votes
0
answers
5086
CAT 2002 | Question: 94
Davji shop sells samosas in boxes of different sizes. The samosas are priced at Rs $2$ per samosa upto $200$ samosas. For every additional $20$ samosas, the price of the whole lot dows down by $10$ paisa per samosa. What should be the maximum size of the box that would maximize the revenue? $240$ $300$ $400$ None of these
Davji shop sells samosas in boxes of different sizes. The samosas are priced at Rs $2$ per samosa upto $200$ samosas. For every additional $20$ samosas, the price of the ...
go_editor
13.9k
points
352
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
ratio-proportion
+
–
1
votes
1
answer
5087
CAT 2002 | Question: 93
It takes $6$ technicians a total of $10$ hours to build a new server from Direct Computer, with each working at the same rate. If six technicians start to build the server at $11$ am and one technician per hour is added beginning at $5$ pm, at what time will be the server be complete? $6:40$ pm $7:00$ pm $7:20$ pm $8:00$ pm
It takes $6$ technicians a total of $10$ hours to build a new server from Direct Computer, with each working at the same rate. If six technicians start to build the serve...
go_editor
13.9k
points
1.1k
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
work-time
+
–
0
votes
1
answer
5088
CAT 2002 | Question: 91
There are 11 alphabets A, H, I, M, O, T, U, V, W, X, Y, Z. They are called symmetrical alphabets. The remaining alphabets are known as asymmetrical alphabets. How many four-lettered passwords can be formed by using symmetrical letters only? (repetitions not allowed) $1086$ $255$ $7920$ None of these
There are 11 alphabets A, H, I, M, O, T, U, V, W, X, Y, Z. They are called symmetrical alphabets. The remaining alphabets are known as asymmetrical alphabets.How many fou...
go_editor
13.9k
points
891
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
permutation-combination
+
–
0
votes
0
answers
5089
CAT 2002 | Question: 88
Answer the question based on the diagram In the diagram below Angle $\text{ABC} = 90^{\circ} = \text{Angle DCH = Angle DOE = Angle EHK = Angle FKL = Angle GLM = Angle LMN,}$ $\text{AB = BC = 2CH = 2CD = EH = FK = 2HK = 4KL = 2LM = MN}$ The magnitude of Angle $\text{FGO =}$ $30^{\circ}$ $45^{\circ}$ $60^{\circ}$ None of these
Answer the question based on the diagramIn the diagram below Angle $\text{ABC} = 90^{\circ} = \text{Angle DCH = Angle DOE = Angle EHK = Angle FKL = Angle GLM = Angle LMN...
go_editor
13.9k
points
725
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
geometry
+
–
0
votes
0
answers
5090
CAT 2002 | Question: 87
A rich merchant had collected many gold coins. He did not want anybody to know about them, One day, his wife asked, How many gold coins do we have? After pausing a moment, he replied, Well! If I divide the coins into two unequal numbers, then $48$ times ... puzzled. Can you help the merchant's wife by finding out how many gold coins the merchant has? $48$ $96$ $32$ $36$
A rich merchant had collected many gold coins. He did not want anybody to know about them, One day, his wife asked, “How many gold coins do we have?” After pausing a ...
go_editor
13.9k
points
331
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
ratio-proportion
+
–
0
votes
0
answers
5091
CAT 2002 | Question: 86
In how many ways, we can choose a black and a white square on a chess board such that the two are not in the same row or column? $32$ $96$ $24$ None of these
In how many ways, we can choose a black and a white square on a chess board such that the two are not in the same row or column?$32$$96$$24$None of these
go_editor
13.9k
points
323
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
permutation-combination
+
–
0
votes
0
answers
5092
CAT 2002 | Question: 85
How many numbers between $0$ and one million can be formed using $0, 7$ and $8?$ $486$ $1086$ $728$ None of these
How many numbers between $0$ and one million can be formed using $0, 7$ and $8?$$486$$1086$$728$None of these
go_editor
13.9k
points
380
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
permutation-combination
+
–
0
votes
0
answers
5093
CAT 2002 | Question: 84
On the corners of a square field of side $14$ metres, $4$ horses are tethered in such a way the adjacent horses just reach to each other. There is a circular pond of area $20$ sq. mt. in the centre of the square. What is the are left ungrazed? $154$ sq. m $22$ sq m $120$ sq. m None of these
On the corners of a square field of side $14$ metres, $4$ horses are tethered in such a way the adjacent horses just reach to each other. There is a circular pond of area...
go_editor
13.9k
points
434
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
time-and-distance
+
–
0
votes
0
answers
5094
CAT 2002 | Question: 83
Neeraj has a rectangular field of size $20 \times 40$ sq.mt. He has to mow the field with a moving machine of width $1$ mt. If he mows the field from the extremes to the centre, then the number of rounds taken by him to mow half of the field will be $3.5$ $3.8$ $3$ $4$
Neeraj has a rectangular field of size $20 \times 40$ sq.mt. He has to mow the field with a moving machine of width $1$ mt. If he mows the field from the extremes to the ...
go_editor
13.9k
points
553
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
time-and-distance
+
–
0
votes
0
answers
5095
CAT 2002 | Question: 82
On a $20$ km tunnel connecting two cities A and B there are three gutters. The distance between gutter $1$ and $2$ is half the distance between gutter and $2$ and $3.$ The distance from city A to its nearest gutter, gutter $1$ is equal to ... taking the patient into and out of the ambulance. $4$ minutes $2.5$ minutes $1.5$ minutes Patient died before reaching the hospital
On a $20$ km tunnel connecting two cities A and B there are three gutters. The distance between gutter $1$ and $2$ is half the distance between gutter and $2$ and $3.$ Th...
go_editor
13.9k
points
562
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
time-and-distance
+
–
0
votes
0
answers
5096
CAT 2002 | Question: 81
The area of the triangle with the vertices $(a,a), (a+1, a)$ and $(a, a+2)$ is $a^3$ $1$ $0$ None of these
The area of the triangle with the vertices $(a,a), (a+1, a)$ and $(a, a+2)$ is$a^3$$1$$0$None of these
go_editor
13.9k
points
317
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
geometry
+
–
0
votes
0
answers
5097
CAT 2002 | Question: 80
Amar went for a holiday to his friend's place. They together either went for yoga in the morning or played tennis in the evening. However, they either went for the yoga in the morning or played tennis, but not both. $14$ mornings and $24$ evenings, they both stayed ... went out together for $22$ days. How many days did Amar stay at his friend's place? $20$ $16$ $30$ $40$
Amar went for a holiday to his friend’s place. They together either went for yoga in the morning or played tennis in the evening. However, they either went for the yoga...
go_editor
13.9k
points
517
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
venn-diagrams
+
–
1
votes
1
answer
5098
CAT 2002 | Question: 79
Three friends went for a picnic. First brought five apples and the second brought three. The third friend however brought only Rs. $8$. What is the share of the first friend? $8$ $7$ $1$ None of these
Three friends went for a picnic. First brought five apples and the second brought three. The third friend however brought only Rs. $8$. What is the share of the first fri...
go_editor
13.9k
points
2.5k
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
ratio-proportion
+
–
0
votes
1
answer
5099
CAT 2002 | Question: 78
A thief was stealing diamonds from a jewellery store. On his way out, he encountered three guards, each was given half of the existing diamonds and two, to cover it by the thief. In the end, he was left with one diamond. How many did the thief steal? $40$ $36$ $42$ $38$
A thief was stealing diamonds from a jewellery store. On his way out, he encountered three guards, each was given half of the existing diamonds and two, to cover it by th...
go_editor
13.9k
points
1.6k
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
ratio-proportion
+
–
0
votes
0
answers
5100
CAT 2002 | Question: 77
A student finds the sum $1 + 2 + 3 + \dots $ as his patience runs out. He found the sum as $575.$ When the teacher declared the result wrong, the student realized that he missed a number. What was the number the student missed? $16$ $18$ $14$ $20$
A student finds the sum $1 + 2 + 3 + \dots $ as his patience runs out. He found the sum as $575.$ When the teacher declared the result wrong, the student realized that he...
go_editor
13.9k
points
311
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
sequences&series
+
–
0
votes
0
answers
5101
CAT 2002 | Question: 76
For all real $\text{X, [X]}$ represents the greatest integer. If $\text{L(X,Y) = [X] + [Y] + [X+Y]}$ and $\text{G(X, Y) = [2X] + [2Y]}.$ Then the ordered pair $\text{(X,Y)}$ cannot be determined if $\text{L(X,Y) > G(X,Y)}$ $\text{L(X,Y) + G(X,Y)}$ $\text{L(X,Y) < G(X,Y)}$ None of these
For all real $\text{X, [X]}$ represents the greatest integer. If $\text{L(X,Y) = [X] + [Y] + [X+Y]}$ and $\text{G(X, Y) = [2X] + [2Y]}.$ Then the ordered pair $\text{(X,Y...
go_editor
13.9k
points
354
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
number-systems
+
–
0
votes
0
answers
5102
CAT 2002 | Question: 75
A man received a cheque. The amount in Rs. has been transposed for paise and vice versa. After spending Rs. $5$ and $42$ paise, he discovered he now had exactly $6$ times the value of the correct cheque amount. What amount he should have received? Rs. $5.30$ Rs. $6.44$ Rs. $60.44$ Rs. $16.44$
A man received a cheque. The amount in Rs. has been transposed for paise and vice versa. After spending Rs. $5$ and $42$ paise, he discovered he now had exactly $6$ times...
go_editor
13.9k
points
1.0k
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
ratio-proportion
+
–
0
votes
0
answers
5103
CAT 2002 | Question: 74
There is a common chord of $2$ circles with radius $15$ and $20.$ The distance between the two centres is $25.$ The length of the chord is $48$ $24$ $36$ $28$
There is a common chord of $2$ circles with radius $15$ and $20.$ The distance between the two centres is $25.$ The length of the chord is$48$$24$$36$$28$
go_editor
13.9k
points
249
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
geometry
+
–
0
votes
0
answers
5104
CAT 2002 | Question: 73
Let $S=2x + 5x^2 + 9x^3 + 14x^4 + 20x^5 \dots \dots $ infinity. The coefficient of $n$-th term is$\frac{n(n+3)}{2}$. Then the sum $S$ is $\frac{x(2-x)}{(1-x)^3}$ $\frac{(2-x)}{(1-x)^3}$ $\frac{x(2-x)}{(1-x)^2}$ None of these
Let $S=2x + 5x^2 + 9x^3 + 14x^4 + 20x^5 \dots \dots $ infinity. The coefficient of $n$-th term is$\frac{n(n+3)}{2}$. Then the sum $S$ is$\frac{x(2-x)}{(1-x)^3}$$\frac{(2-...
go_editor
13.9k
points
253
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
infinite-geometric-progression
+
–
0
votes
0
answers
5105
CAT 2002 | Question: 72
The remainder when $2^{256}$ is divided by $17$ is $7$ $13$ $11$ $1$
The remainder when $2^{256}$ is divided by $17$ is$7$$13$$11$$1$
go_editor
13.9k
points
281
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
number-systems
+
–
0
votes
0
answers
5106
CAT 2002 | Question: 71
In the figure given below, find the distance $\text{PQ}.$ $7$ m $4.5$ m $10.5$ m $6$ m
In the figure given below, find the distance $\text{PQ}.$ $7$ m$4.5$ m$10.5$ m$6$ m
go_editor
13.9k
points
338
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
geometry
+
–
0
votes
0
answers
5107
CAT 2002 | Question: 70
The internal bisector of an angle $\text{A}$ in a triangle $\text{ABC}$ meets the side $\text{BC}$ at point $\text{D. AB = 4, AC = 3}$ and angle $\text{A} = 60^{\circ}$. Then what is the length of the bisector $\text{AD}?$ $\frac{12 \sqrt{3}}{7}$ $\frac{12 \sqrt{13}}{7}$ $\frac{4 \sqrt{13}}{7}$ $\frac{4 \sqrt{3}}{7}$
The internal bisector of an angle $\text{A}$ in a triangle $\text{ABC}$ meets the side $\text{BC}$ at point $\text{D. AB = 4, AC = 3}$ and angle $\text{A} = 60^{\circ}$. ...
go_editor
13.9k
points
333
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
geometry
+
–
0
votes
0
answers
5108
CAT 2002 | Question: 69
On a straight road $\text{XY}, 100$ metres in length, $5$ stones are kept beginning from the end $\text{X}.$ The distance between two adjacent stones is $2$ metres. A man is asked to collect the stones one at a time and put at the end $\text{Y}.$ What is the distance covered by him? $460$ metres $540$ metres $860$ metres $920$ metres
On a straight road $\text{XY}, 100$ metres in length, $5$ stones are kept beginning from the end $\text{X}.$ The distance between two adjacent stones is $2$ metres. A man...
go_editor
13.9k
points
349
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
speed-distance-time
+
–
0
votes
0
answers
5109
CAT 2002 | Question: 68
If $f(x) = \log(1+x)/(1-x))$, then $f(x)+f(y)=$ $f(x+y)$ $f(1+xy)$ $(x+y) \: f(1+xy)$ $f (\frac{x+y}{1+xy})$
If $f(x) = \log(1+x)/(1-x))$, then $f(x)+f(y)=$$f(x+y)$$f(1+xy)$$(x+y) \: f(1+xy)$$f (\frac{x+y}{1+xy})$
go_editor
13.9k
points
265
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
functions
+
–
0
votes
0
answers
5110
CAT 2002 | Question: 67
If $\text{U, V, W}$ and $m$ are natural numbers such that $\text{U}^m + \text{V}^m = \text{W}^m$, then which of the following is true? $m < \min\text{(U, V, W)}$ $m > \max\text{(U, V, W)}$ $m < \max\text{(U, V, W)}$ None of these
If $\text{U, V, W}$ and $m$ are natural numbers such that $\text{U}^m + \text{V}^m = \text{W}^m$, then which of the following is true?$m < \min\text{(U, V, W)}$$m \max\t...
go_editor
13.9k
points
293
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
number-systems
+
–
0
votes
0
answers
5111
CAT 2002 | Question: 66
Mayank, Mirza, Little and Jagbir bought a motorbike for $\$60.$ Mayank contributed half of the total amount contributed by others. Mirza contributed one-third of total amount contributed by other, and Little contributed one-fourth of the total amount contributed by others. What was the money paid Jagbir? $\$12$ $\$13$ $\$18$ $\$20$
Mayank, Mirza, Little and Jagbir bought a motorbike for $\$60.$ Mayank contributed half of the total amount contributed by others. Mirza contributed one-third of total am...
go_editor
13.9k
points
385
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
ratio-proportion
+
–
0
votes
0
answers
5112
CAT 2002 | Question: 65
The number of roots of $\frac{A^2}{x} + \frac{b^2}{x-1} =1$ is $1$ $2$ $3$ None of these
The number of roots of $\frac{A^2}{x} + \frac{b^2}{x-1} =1$ is $1$$2$$3$None of these
go_editor
13.9k
points
275
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
quadratic-equations
+
–
0
votes
0
answers
5113
CAT 2002 | Question: 64
In order to cover less distance, a boy – rather than going along the longer and the shorter lengths of the rectangular path, goes by the diagonal. The boy finds that he saved a distance equal to half the longer side. The ration of the length and breadth is $1/2$ $2/3$ $3/4$ $7/15$
In order to cover less distance, a boy – rather than going along the longer and the shorter lengths of the rectangular path, goes by the diagonal. The boy finds that he...
go_editor
13.9k
points
379
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
geometry
+
–
0
votes
0
answers
5114
CAT 2002 | Question: 63
$n_1, n_2, n_3, \dots, n_{10}$ are 10 numbers such that $n_1 > 0$ and the numbers are given in ascending order. How many triplets can be formed using these numbers such that in each triplet, the first number is less than the second number, and the second number is less than the third number? $109$ $27$ $36$ None of these
$n_1, n_2, n_3, \dots, n_{10}$ are 10 numbers such that $n_1 0$ and the numbers are given in ascending order. How many triplets can be formed using these numbers such th...
go_editor
13.9k
points
325
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
number-systems
+
–
1
votes
0
answers
5115
CAT 2002 | Question: 62
For all integers $n>0, \: \: 7^{6n} - 6^{6n}$ is divisible by $13$ $128$ $549$ None of these
For all integers $n>0, \: \: 7^{6n} - 6^{6n}$ is divisible by$13$$128$$549$None of these
go_editor
13.9k
points
309
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
number-systems
+
–
1
votes
0
answers
5116
CAT 2002 | Question: 61
A string of length $40$ meters is divided into three parts of different lengths. The first part is three times the second part, and the last part is $23$ meters smaller than the first part. Find the length of the largest part $27$ $4$ $5$ $9$
A string of length $40$ meters is divided into three parts of different lengths. The first part is three times the second part, and the last part is $23$ meters smaller t...
go_editor
13.9k
points
341
views
go_editor
asked
Mar 1, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
number-systems
+
–
0
votes
0
answers
5117
CAT 2002 | Question: 60
A boy finds the average of $10$ positive integers. Each integer contains two digits. By mistake, the boy interchanges the digits of one number say $ba$ for $ab.$ Due to this, the average becomes $1.8$ less than the previous one. What is the difference between two digits $a$ and $b?$ $4$ $2$ $6$ $8$
A boy finds the average of $10$ positive integers. Each integer contains two digits. By mistake, the boy interchanges the digits of one number say $ba$ for $ab.$ Due to t...
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Mar 1, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
average
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1
votes
1
answer
5118
CAT 2002 | Question: 59
Number $\text{S}$ is equal to the square of the sum of the digits of a $2$ digit number $\text{D}.$ If the difference between $\text{S}$ and $\text{D}$ is $27,$ then $\text{D}$ is $32$ $54$ $64$ $52$
Number $\text{S}$ is equal to the square of the sum of the digits of a $2$ digit number $\text{D}.$ If the difference between $\text{S}$ and $\text{D}$ is $27,$ then $\te...
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Mar 1, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
number-systems
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0
votes
1
answer
5119
CAT 2002 | Question: 58
In the following figure, the area of the isosceles right triangle $\text{ABE}$ is $7$ sq.cm. If $\text{EC = 3BE},$ then the area of rectangle $\text{ABCD}$ id (insq.cm.) $64$ $82$ $26$ $56$
In the following figure, the area of the isosceles right triangle $\text{ABE}$ is $7$ sq.cm. If $\text{EC = 3BE},$ then the area of rectangle $\text{ABCD}$ id (insq.cm.)$...
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983
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Mar 1, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
geometry
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0
votes
0
answers
5120
CAT 2002 | Question: 57
If $x^2 + 5y^2 + z^2 = 2y(2x+z)$, then which of the following statements are necessarily true? $x=2y$ $x=2z$ $2x=z$ Only I Only II Only III Only I and II
If $x^2 + 5y^2 + z^2 = 2y(2x+z)$, then which of the following statements are necessarily true?$x=2y$$x=2z$$2x=z$Only IOnly IIOnly IIIOnly I and II
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311
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Quantitative Aptitude
cat2002
quantitative-aptitude
algebra
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