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Recent questions in Quantitative Aptitude
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1601
CAT 2000 | Question: 106
ABCDEFGH is a regular octagon. A and E are opposite vertices of the octagon. A frog starts jumping from vertex to vertex, beginning from A. From any vertex of the octagon except E, it may jump to either of the two adjacent vertices. When it reaches E, the frog stops ... n jumps ending in E. Then what is the value of $a_{2n - 1}$? Zero Four $2n - 1 $ Cannot be determined
ABCDEFGH is a regular octagon. A and E are opposite vertices of the octagon. A frog starts jumping from vertex to vertex, beginning from A. From any vertex of the octagon...
go_editor
13.9k
points
672
views
go_editor
asked
Mar 30, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
geometry
+
–
0
votes
0
answers
1602
CAT 2000 | Question: 105
The set of all positive integers is the union of two disjoint subsets $\{f(1), f(2),\dots ,f(n),\dots\}$ and $\{g(1), g(2),\dots,g(n),\dots\},$ where $f(1) < f(2) <\dots < f(n) < \dots,$ and $g(1) < g(2) <\dots< g(n) < \dots,$ and $g(n) = f(f(n)) + 1$ for all $n \geq 1.$ What is the value of $g(1)?$ Zero Two One Cannot be determined
The set of all positive integers is the union of two disjoint subsets $\{f(1), f(2),\dots ,f(n),\dots\}$ and $\{g(1), g(2),\dots,g(n),\dots\},$ where $f(1) < f(2) <\dots ...
go_editor
13.9k
points
881
views
go_editor
asked
Mar 30, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
functions
+
–
–1
votes
0
answers
1603
CAT 2000 | Question: 104
There are three cities A, B and C, each of these cities is connected with the other two cities by at least one direct road. If a traveller wants to go from one city (origin) to another city (destination), she can do so either by traversing a road connecting the two ... from B to C (including those via A). How many roads are there from A to C directly? $6$ $3$ $5$ $10$
There are three cities A, B and C, each of these cities is connected with the other two cities by at least one direct road. If a traveller wants to go from one city (orig...
go_editor
13.9k
points
913
views
go_editor
asked
Mar 29, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
graphs
+
–
0
votes
0
answers
1604
CAT 2000 | Question: 103
A shipping clerk has five boxes of different but unknown weights each weighing less than $100$ kg. The clerk weighs the boxes in pairs. The weights obtained are $110, 112, 113, 114, 115, 116, 117, 118, 120$ and $121$ kg. What is the weight, in kg, of the heaviest box? $60$ $62$ $64$ Cannot be determined
A shipping clerk has five boxes of different but unknown weights each weighing less than $100$ kg. The clerk weighs the boxes in pairs. The weights obtained are $110, 112...
go_editor
13.9k
points
635
views
go_editor
asked
Mar 29, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
average
+
–
0
votes
0
answers
1605
CAT 2000 | Question: 102
In the figure above, $\text{AB = BC = CD = DE = EF = FG = GA}.$ Then $\measuredangle \text{DAE}$ is approximately $15^{\circ}$ $20^{\circ}$ $30^{\circ}$ $25^{\circ}$
In the figure above, $\text{AB = BC = CD = DE = EF = FG = GA}.$ Then $\measuredangle \text{DAE}$ is approximately$15^{\circ}$ $20^{\circ}$$30^{\circ}$$25^{\circ}$
go_editor
13.9k
points
408
views
go_editor
asked
Mar 29, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
geometry
+
–
0
votes
0
answers
1606
CAT 2000 | Question: 101
If $a, b, c$ are the sides of a triangle, and $a^2 + b^2 + c^2 = bc + ca + ab$, then the triangle is equilateral isosceles right angled obtuse angled
If $a, b, c$ are the sides of a triangle, and $a^2 + b^2 + c^2 = bc + ca + ab$, then the triangle isequilateral isoscelesright angled obtuse angled
go_editor
13.9k
points
397
views
go_editor
asked
Mar 29, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
geometry
+
–
0
votes
0
answers
1607
CAT 2000 | Question: 100
If the equation $x^3 – ax^2 + bx – a = 0$ has three real roots, then it must be the case that $b=1$ $b \neq 1$ $a=1$ $a \neq 1$
If the equation $x^3 – ax^2 + bx – a = 0$ has three real roots, then it must be the case that$b=1$$b \neq 1$$a=1$$a \neq 1$
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13.9k
points
290
views
go_editor
asked
Mar 29, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
cubic-equations
+
–
0
votes
2
answers
1608
CAT 2000 | Question: 99
The area bounded by the three curves $|x + y| = 1, |x| = 1$, and $|y| = 1$, is equal to $4$ $3$ $2$ $1$
The area bounded by the three curves $|x + y| = 1, |x| = 1$, and $|y| = 1$, is equal to$4$ $3$$2$$1$
go_editor
13.9k
points
815
views
go_editor
asked
Mar 29, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
absolute-value
+
–
0
votes
0
answers
1609
CAT 2000 | Question: 98
There is a vertical stack of books marked $1, 2,$ and $3$ on Table-A, with $1$ at the bottom and $3$ on top. These are to be placed vertically on Table-B with $1$ at the bottom and $2$ on the top, by making a series of ... table without disturbing the order of books in it. What is the minimum number of moves in which the above task can be accomplished? One Two Three Four
There is a vertical stack of books marked $1, 2,$ and $3$ on Table-A, with $1$ at the bottom and $3$ on top. These are to be placed vertically on Table-B with $1$ at the ...
go_editor
13.9k
points
487
views
go_editor
asked
Mar 29, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
number-systems
+
–
0
votes
0
answers
1610
CAT 2000 | Question: 97
Consider a circle with unit radius. There are $7$ adjacent sectors, $\text{S}_1, \text{S}_2, \text{S}_3,\dots, \text{S}_7$ in the circle such that their total area is $(1/8)$th of the area of the circle. Further, the area of the $j$-th sector is twice that of the ... $\frac{\pi}{508}$ $\frac{\pi}{2040}$ $\frac{\pi}{1016}$ $\frac{\pi}{1524}$
Consider a circle with unit radius. There are $7$ adjacent sectors, $\text{S}_1, \text{S}_2, \text{S}_3,\dots, \text{S}_7$ in the circle such that their total area is $(1...
go_editor
13.9k
points
436
views
go_editor
asked
Mar 29, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
geometry
+
–
0
votes
1
answer
1611
CAT 2000 | Question: 96
$\text{ABCD}$ is a rhombus with the diagonals $\text{AC}$ and $\text{BD}$ intersecting at the origin on the $x-y$ plane. The equation of the straight line $\text{AD}$ is $x + y = 1.$ What is the equation of $\text{BC}?$ $x + y = –1$ $x – y = –1$ $x + y = 1$ None of the above
$\text{ABCD}$ is a rhombus with the diagonals $\text{AC}$ and $\text{BD}$ intersecting at the origin on the $x-y$ plane. The equation of the straight line $\text{AD}$ is ...
go_editor
13.9k
points
1.3k
views
go_editor
asked
Mar 29, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
geometry
+
–
0
votes
2
answers
1612
CAT 2000 | Question: 95
If $x^2 + y^2 = 0.1$ and $|x – y| = 0.2$, then $| x | + | y |$ is equal to $0.3$ $0.4$ $0.2$ $0.6$
If $x^2 + y^2 = 0.1$ and $|x – y| = 0.2$, then $| x | + | y |$ is equal to$0.3$$0.4$$0.2$$0.6$
go_editor
13.9k
points
1.0k
views
go_editor
asked
Mar 29, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
absolute-value
+
–
0
votes
1
answer
1613
CAT 2000 | Question: 94
Let $\text{N} = 55^3 + 17^3 – 72^3.\; \text{N}$ is divisible by both $7$ and $13$ both $3$ and $13$ both $17$ and $7$ both $3$ and $17$
Let $\text{N} = 55^3 + 17^3 – 72^3.\; \text{N}$ is divisible byboth $7$ and $13$both $3$ and $13$both $17$ and $7$both $3$ and $17$
go_editor
13.9k
points
615
views
go_editor
asked
Mar 29, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
number-systems
+
–
0
votes
0
answers
1614
CAT 2000 | Question: 89
Answer the following questions based on the information given below. Sixteen teams have been invited to participate in the ABC Gold Cup cricket tournament. The tournament is conducted in two stages. In the first stage, the teams are divided into two groups. Each group ... to the next stage. What is the total number of matches played in the tournament? $28$ $55$ $63$ $35$
Answer the following questions based on the information given below.Sixteen teams have been invited to participate in the ABC Gold Cup cricket tournament. The tournament ...
go_editor
13.9k
points
361
views
go_editor
asked
Mar 29, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
permutation-combination
+
–
0
votes
0
answers
1615
CAT 2000 | Question: 87
Answer the following question based on the information given below. For a real number $x$, let f(x) = 1/(1 + x), if x is non-negative = 1+ x, if x is negative f$^n$(x) = f(f$^{n – 1}$(x)), n = 2, 3, .... What is the value of the product, $f(2)f^2(2)f^3(2)f^4(2)f^5(2)$? $\frac{1}{3}$ $3$ $\frac{1}{18}$ None of these
Answer the following question based on the information given below.For a real number $x$, letf(x)= 1/(1 + x),if x is non-negative = 1+ x,if x is negativef$^n$(x)= f(f$^{n...
go_editor
13.9k
points
322
views
go_editor
asked
Mar 29, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
functions
+
–
0
votes
0
answers
1616
CAT 2000 | Question: 85
Answer the following question based on the information given below. There are three bottles of water, A, B, C, whose capacities are $5$ litres, $3$ litres, and $2$ litres respectively. For transferring water from one bottle to another and to drain ... EMPTY (C, B) The second instruction transfers water from B to C The second instruction involves using the water in bottle A.
Answer the following question based on the information given below.There are three bottles of water, A, B, C, whose capacities are $5$ litres, $3$ litres, and $2$ litres ...
go_editor
13.9k
points
472
views
go_editor
asked
Mar 29, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
work-time
pipes-cistern
+
–
0
votes
0
answers
1617
CAT 2000 | Question: 82
Answer the following question based on the information given below. Given below is a graph made up of straight-line segments shown as thick lines. Choose the answer as if $f(x) = 3 f(–x);$ if $f(x) = –f(–x);$ if $f(x) = f(–x);$ and if $3 f(x) = 6 f(–x),$ for $x\geq 0.$ $1$ $2$ $3$ $4$
Answer the following question based on the information given below.Given below is a graph made up of straight-line segments shown as thick lines. Choose the answer asif $...
go_editor
13.9k
points
336
views
go_editor
asked
Mar 29, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
functions
+
–
0
votes
0
answers
1618
CAT 2000 | Question: 80
Answer the following questions based on the information given below. There are five machines A, B C, D and E situated on a straight line at distances of $10$ metres, $20$ metres, $30$ metres, $40$ metres and $50$ metres respectively from the origin of the line. ... message of E? Assume that the speed of movement of the robot is $10$ metres per second. $140$ $80$ $340$ $360$
Answer the following questions based on the information given below.There are five machines A, B C, D and E situated on a straight line at distances of $10$ metres, $20$ ...
go_editor
13.9k
points
368
views
go_editor
asked
Mar 29, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
speed-distance-time
+
–
0
votes
0
answers
1619
CAT 2000 | Question: 77
Answer the following question based on the information given below. For three distinct real numbers $x, y$ and $z,$ let $f(x, y, z) = \min(\max(x, y), \max(y, z), \max(z, x))$ $g(x, y, z) = \max(\min(x, y), \min(y, z), \min(z, x))$ ... $f(x, y, z)/g(x, y, z)$ $(f(x, y, z) + h(x, y, z) - g(x, y, z))/j(x, y, z)$
Answer the following question based on the information given below.For three distinct real numbers $x, y$ and $z,$ let$f(x, y, z) = \min(\max(x, y), \max(y, z), \max(z, x...
go_editor
13.9k
points
352
views
go_editor
asked
Mar 29, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
functions
+
–
0
votes
0
answers
1620
CAT 2000 | Question: 75
Answer the following question based on the information given below. For real numbers $x, y,$ let $f(x, y) = \left\{\begin{matrix} \text{Positive square-root of}\; (x + y),\;\text{if}\; (x + y)^{0.5}\;\text{is real} \\ (x + y)^2,\;\text{otherwise} \end{matrix}\right.$ ... $f(x, y) - (g(x, y))^2$ $g(x, y) - (f(x, y))^2$ $f(x, y) + g(x, y)$
Answer the following question based on the information given below.For real numbers $x, y,$ let$f(x, y) = \left\{\begin{matrix} \text{Positive square-root of}\; (x + y),\...
go_editor
13.9k
points
407
views
go_editor
asked
Mar 29, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
functions
+
–
1
votes
2
answers
1621
CAT 2000 | Question: 73
$\text{A, B, C}$ are three numbers. Let $@ \text{(A, B)} =$ average of $\text{A}$ and $\text{B}$, $/ \text{(A, B)} = $ product of $\text{A}$ and $\text{B}$, and $\text{X(A, B)} = $ the result of dividing $\text{A}$ by $\text{B}$ The sum of $\text{A}$ and $\text{B}$ is given by $/(@\text{(A, B)}, 2)$ $X(@\text{(A, B)}, 2)$ $@(/\text{(A, B)}, 2)$ $@(X\text{(A, B)}, 2)$
$\text{A, B, C}$ are three numbers. Let $@ \text{(A, B)} =$ average of $\text{A}$ and $\text{B}$, $/ \text{(A, B)} = $ product of $\text{A}$ and $\text{B}$, and $\text{X...
go_editor
13.9k
points
1.8k
views
go_editor
asked
Mar 28, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
algebra
+
–
3
votes
1
answer
1622
CAT 2000 | Question: 72
Sam has forgotten his friend’s seven-digit telephone number. He remembers the following: the first three digits are either $635$ or $674,$ the number is odd, and the number nine appears once. If Sam were to use a trial and error process to reach his friend, what is the minimum number of trials he has to make before he can be certain to succeed? $1000$ $2430$ $3402$ $3006$
Sam has forgotten his friend’s seven-digit telephone number. He remembers the following: the first three digits are either $635$ or $674,$ the number is odd, and the nu...
go_editor
13.9k
points
21.9k
views
go_editor
asked
Mar 28, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
number-systems
+
–
0
votes
0
answers
1623
CAT 2000 | Question: 71
The table below shows the age-wise distribution of the population of Reposia. The number of people aged below $35$ years is $400$ million. Age Group Percentage Below 15 years 30.00 15-24 17.75 25-34 17.00 35-44 14.50 45-54 12.50 55-64 7.10 65 and above 1.15 If the ... is $0.96,$ then what is the number of females (in millions) in that age group? $82.8$ $90.8$ $80.0$ $90.0$
The table below shows the age-wise distribution of the population of Reposia. The number of people aged below $35$ years is $400$ million.Age GroupPercentageBelow 15 year...
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13.9k
points
693
views
go_editor
asked
Mar 28, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
percentage
+
–
0
votes
0
answers
1624
CAT 2000 | Question: 70
Each of the numbers $x_1, x_2,\dots, x_n, n > 4,$ is equal to $1$ or $–1.$ Suppose, $x_1x_2x_3x_4 + x_2x_3x_4x_5 + x_3x_4x_5x_6 + \dots + x_{n–3}x_{n–2}x_{n–1}x_n + x_{n–2}x_{n–1}x_nx_1+ x_{n–1}x_nx_1x_2 + x_nx_1x_2x_3= 0$, then, $n$ is even. $n$ is odd. $n$ is an odd multiple of $3.$ $n$ is prime
Each of the numbers $x_1, x_2,\dots, x_n, n 4,$ is equal to $1$ or $–1.$ Suppose, $x_1x_2x_3x_4 + x_2x_3x_4x_5 + x_3x_4x_5x_6 + \dots + x_{n–3}x_{n–2}x_{n–1}x_n ...
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13.9k
points
394
views
go_editor
asked
Mar 28, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
algebra
+
–
0
votes
0
answers
1625
CAT 2000 | Question: 69
The integers $34041$ and $32506$ when divided by a three-digit integer $`n\text{’}$ leave the same remainder. What is $`n\text{’}?$ $289$ $367$ $453$ $307$
The integers $34041$ and $32506$ when divided by a three-digit integer $ n\text{’}$ leave the same remainder. What is $ n\text{’}?$$289$$367$$453$$307$
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13.9k
points
364
views
go_editor
asked
Mar 28, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
number-systems
+
–
1
votes
1
answer
1626
CAT 2000 | Question: 68
Let $\text{N} = 1421 \times 1423 \times 1425.$ What is the remainder when $\text{N}$ is divided by $12?$ $0$ $9$ $3$ $6$
Let $\text{N} = 1421 \times 1423 \times 1425.$ What is the remainder when $\text{N}$ is divided by $12?$$0$$9$$3$$6$
go_editor
13.9k
points
602
views
go_editor
asked
Mar 28, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
number-systems
+
–
0
votes
0
answers
1627
CAT 2000 | Question: 67
What is the number of distinct triangles with integral valued sides and perimeter $14? $ $6$ $5$ $4$ $3$
What is the number of distinct triangles with integral valued sides and perimeter $14? $$6$$5$$4$$3$
go_editor
13.9k
points
328
views
go_editor
asked
Mar 28, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
permutation-combination
+
–
0
votes
0
answers
1628
CAT 2000 | Question: 66
Let $\text{S}$ be the set of prime numbers greater than or equal to $2$ and less than $100.$ Multiply all elements of $\text{S}.$ With how many consecutive zeros will the product end? $1$ $4$ $5$ $10$
Let $\text{S}$ be the set of prime numbers greater than or equal to $2$ and less than $100.$ Multiply all elements of $\text{S}.$ With how many consecutive zeros will the...
go_editor
13.9k
points
407
views
go_editor
asked
Mar 28, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
number-systems
+
–
1
votes
1
answer
1629
CAT 2000 | Question: 65
Let $x, y$ and $z$ be distinct integers, that are odd and positive. Which one of the following statements cannot be true? $xyz^2$ is odd. $(x − y)^2 z$ is even. $(x + y − z)^2 (x + y)$ is even. $(x − y) (y + z) (x + y − z)$ is odd
Let $x, y$ and $z$ be distinct integers, that are odd and positive. Which one of the following statements cannot be true?$xyz^2$ is odd.$(x − y)^2 z$ is even.$(x + y �...
go_editor
13.9k
points
757
views
go_editor
asked
Mar 28, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
algebra
+
–
0
votes
0
answers
1630
CAT 2000 | Question: 64
Let $\text{S}$ be the set of integers $x$ such that $100 < x < 200$ $x$ is odd $x$ is divisible by $3$ but not by $7$ How many elements does $\text{S}$ contain? $16$ $12$ $11$ $13$
Let $\text{S}$ be the set of integers $x$ such that$100 < x < 200$$x$ is odd$x$ is divisible by $3$ but not by $7$How many elements does $\text{S}$ contain?$16$$12$$11$$1...
go_editor
13.9k
points
447
views
go_editor
asked
Mar 28, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
number-systems
+
–
1
votes
2
answers
1631
CAT 2000 | Question: 63
One red flag, three white flags and two blue flags are arranged in a line such that, no two adjacent flags are of the same colour. the flags at the two ends of the line are of different colours. In how many different ways can the flags be arranged? $6$ $4$ $10$ $2$
One red flag, three white flags and two blue flags are arranged in a line such that,no two adjacent flags are of the same colour.the flags at the two ends of the line are...
go_editor
13.9k
points
3.8k
views
go_editor
asked
Mar 28, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
permutation-combination
+
–
0
votes
0
answers
1632
CAT 2000 | Question: 62
If $x > 2$ and $y > – 1,$ Then which of the following statements is necessarily true? $xy > –2$ $–x < 2y$ $xy < –2$ $–x > 2y$
If $x 2$ and $y – 1,$ Then which of the following statements is necessarily true?$xy –2$$–x < 2y$$xy < –2$$–x 2y$
go_editor
13.9k
points
413
views
go_editor
asked
Mar 28, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
inequalities
+
–
0
votes
0
answers
1633
CAT 2000 | Question: 61
Consider a sequence of seven consecutive integers. The average of the first five integers is $n.$ The average of all the seven integers is $n$ $n+1$ $\text{K} \times n, \text {where K is a function of } n$ $n + \frac{2}{7}$
Consider a sequence of seven consecutive integers. The average of the first five integers is $n.$ The average of all the seven integers is$n$$n+1$$\text{K} \times n, \tex...
go_editor
13.9k
points
360
views
go_editor
asked
Mar 28, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
average
+
–
0
votes
0
answers
1634
CAT 2000 | Question: 60
A truck travelling at $70$ kilometres per hour uses $30\%$ more diesel to travel a certain distance than it does when it travels at the speed of $50$ kilometres per hour. If the truck can travel $19.5$ kilometres on a litre of diesel at $50$ kilometres per hour, ... can the truck travel on $10$ litres of diesel at a speed of $70$ kilometres per hour? $130$ $140$ $150$ $175$
A truck travelling at $70$ kilometres per hour uses $30\%$ more diesel to travel a certain distance than it does when it travels at the speed of $50$ kilometres per hour....
go_editor
13.9k
points
418
views
go_editor
asked
Mar 28, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
speed-distance-time
+
–
0
votes
0
answers
1635
CAT 2000 | Question: 59
What is the value of the following expression? $\frac{1}{2^2 -1} + \frac{1}{4^2 -1} + \frac{1}{6^2 -1} + \dots + \frac{1}{20^2 -1}$ $\frac{9}{19}$ $\frac{10}{19}$ $\frac{10}{21}$ $\frac{11}{21}$
What is the value of the following expression?$\frac{1}{2^2 -1} + \frac{1}{4^2 -1} + \frac{1}{6^2 -1} + \dots + \frac{1}{20^2 -1}$$\frac{9}{19}$$\frac{10}{19}$$\frac{10}{...
go_editor
13.9k
points
334
views
go_editor
asked
Mar 28, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
sequences&series
+
–
0
votes
0
answers
1636
CAT 2000 | Question: 58
If $a_1 = 1$ and $a_{n+1} = 2a_{n + 5}, n = 1, 2, \dots ,$ then $a_{100}$ is equal to $(5 × 2^99 – 6)$ $(5 × 2^99 + 6)$ $(6 × 2^99 + 5)$ $(6 × 2^99 – 5)$
If $a_1 = 1$ and $a_{n+1} = 2a_{n + 5}, n = 1, 2, \dots ,$ then $a_{100}$ is equal to$(5 × 2^99 – 6)$$(5 × 2^99 + 6)$$(6 × 2^99 + 5)$$(6 × 2^99 – 5)$
go_editor
13.9k
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251
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go_editor
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Mar 28, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
sequences&series
+
–
0
votes
1
answer
1637
CAT 2000 | Question: 57
$\begin{array}{|c|c|c|c|c|c|c|c|} \hline x & 1 & 2 & 3 & 4 & 5 & 6 \\\hline y & 4 & 8 & 14 & 22 & 32 & 44 \\\hline \end{array}$ In the above table, for suitably chosen constants $a, b$ and $c,$ which one of ... best describes the relation between $y$ and $x?$ $y = a + bx$ $y = a + bx + cx^2$ $y = e^{a + bx}$ None of the above
$\begin{array}{|c|c|c|c|c|c|c|c|} \hline x & 1 & 2 & 3 & 4 & 5 & 6 \\\hline y & 4 & 8 & 14 & 22 & 32 & 44 \\\hline \end{array}$In the above table, for suitably chosen con...
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13.9k
points
547
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go_editor
asked
Mar 26, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
algebra
+
–
0
votes
0
answers
1638
CAT 2000 | Question: 56
Let $\text{D}$ be a recurring decimal of the form, $\text{D} = 0.a_1a_2a_1a_2a_1a_2 \dots,$ where digits $a_1$ and $a_2$ lie between $0$ and $9.$ Further, at most one of them is zero. Then which of the following numbers necessarily produces an integer, when multiplied by $\text{D}?$ $18$ $108$ $198$ $288$
Let $\text{D}$ be a recurring decimal of the form, $\text{D} = 0.a_1a_2a_1a_2a_1a_2 \dots,$ where digits $a_1$ and $a_2$ lie between $0$ and $9.$ Further, at most one of ...
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13.9k
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358
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asked
Mar 26, 2016
Quantitative Aptitude
cat2000
quantitative-aptitude
number-systems
+
–
0
votes
2
answers
1639
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 $4.$ ...
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13.9k
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1.0k
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go_editor
asked
Mar 2, 2016
Quantitative Aptitude
quantitative-aptitude
cat2002
permutation-combination
+
–
0
votes
0
answers
1640
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...
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13.9k
points
846
views
go_editor
asked
Mar 2, 2016
Quantitative Aptitude
cat2002
quantitative-aptitude
lcm-hcf
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