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Any cyclic parallelogram having unequal adjacent sides is necessarily a

A) square
B) rectangle
C) rhombus
D) trapezium

Correct Answer:


B) rectangle

Description for Correct answer:
It is a rectangle.

Part of solved Aptitude questions and answers : >> Aptitude

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Similar Questions

1). The length of three sides of a triangle are known. In which of the cases given below, it is impossible to construct a triangle?

A). 15 cm, 12 cm, 10 cm

B). 3.6 cm, 4.3 cm, 5.7 cm

C). 17 cm, 12 cm, 6 cm

D). 2.3 cm, 4.4 cm, 6.8 cm

2). Two non-intersecting circles, one lying inside another are of diameters a and b. The minimum distance between b/w their circumferences is c. The distance between their centre is

A). a - b - c

B). a + b - c

C). \( \Large \frac{1}{2} (a - b - c) \)

D). \( \Large \frac{1}{2} (a - b) - c \)

3). A tin of oil was four fifth full. When six bottles of oil were taken out and four bottles of oil were poured into it, it was three fourth full. How many bottles of oil were contained by the tin?

A). 10

B). 20

C). 30

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4). A number consists of two digits. If the digits in the unit's place and the ten's place are 7 and x respectively, the number is ---

A). x + 7

B). 10 ( x + 7 )

C). 70 + x

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5). The sum of the digits of a three digit number is 16. If the ten's digit of the number is 3 times the unit's digit and the unit's digit is one-fourth of the hundredth digit, then what is the number ?

A). 446

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6). If \( \Large x^{11} = y^{0} \) and x = 2y, then y is equal to ----

A). \( \Large \frac{1}{2} \)

B). 1

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7). Pipes A and B can fill a tank in 5 and 6 h respectively. Pipe C can empty it in 12 h. The tank is half full. All the three pipes are in operation simultaneously. After how much lime the tank will be full?

A). \( \Large 3 \frac{9}{17} h \)

B). 11 h

C). \( \Large 2 \frac{8}{11} h \)

D). \( \Large 1 \frac{13}{17} h \)

8). In climbing a 21 m long round pole, a monkey climbs 6 m in the first minute and slips 3 m in the next minute. What time (in minutes) the monkey would take to reach the top of the pole?

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B). 14

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9). The solution of the equation \( \Large \sqrt{25 - x^{2}} = x - 1 \) are

A). x = 3 and x = 4

B). x = 5 and x = 1

C). x = -3 and x = 4

D). x = 4 and x \( \Large \neq \) -3

10). Which one of the following is a factor of \( \Large x^{3} - 19x + 30 \) ?

A). x - 2

B). x + 2

C). x - 1

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