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Test: Logarithm- 2 - CAT MCQ


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10 Questions MCQ Test Quantitative Aptitude (Quant) - Test: Logarithm- 2

Test: Logarithm- 2 for CAT 2024 is part of Quantitative Aptitude (Quant) preparation. The Test: Logarithm- 2 questions and answers have been prepared according to the CAT exam syllabus.The Test: Logarithm- 2 MCQs are made for CAT 2024 Exam. Find important definitions, questions, notes, meanings, examples, exercises, MCQs and online tests for Test: Logarithm- 2 below.
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Test: Logarithm- 2 - Question 1

Which of the following statements is not correct?

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Test: Logarithm- 2 - Question 2

If log(64)= 1.806, log(16) = ?

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Test: Logarithm- 2 - Question 3

if log 2 = 0.30103 and log 3 = 0.4771, find the number of digits in (648)5.

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Test: Logarithm- 2 - Question 4

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Test: Logarithm- 2 - Question 5

For a real number a, if then a must lie in the range

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Converting all logs to base 10.

⇒ loga32 + loga15 = 4

⇒ loga(32 × 15) = 4

⇒ a4 = 480

This is possible when 4 < a < 5.

Hence, option (a).

Test: Logarithm- 2 - Question 6

If y is a negative number such that  then y equals

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Taking log on both sides (Choosing the base to be 3)

⇒ y2 × log35 × log32 = log23 × log35

⇒ y2 × log32 = log23

⇒ - y2 = (log23)2

⇒ y = - log23 (∵ y is a negative number)

⇒ y = log2(1/3)

Hence, option (d).

Test: Logarithm- 2 - Question 7

The value of⁡ loga (a/b) + log(b/a) for 1 < a ≤ b cannot be equal to

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We know logab is positive and sum of a positive number and its reciprocal is always ≥ 2, i.e.,

∴ logab + logba ≥ 2

⇒ 2 – (logab + logba) ≤ 2 – 2

⇒ 2 – (logab + logba) ≤ 0

∴ 2 – (logab + logba) cannot take positive value i.e., it cannot be equal to 1 (option (b))

Hence, option (c).

Test: Logarithm- 2 - Question 8

If loga30 = A, loga(5/3) = -B and log2a = 1/3, then log3a equals

Detailed Solution for Test: Logarithm- 2 - Question 8

Since all the 4 options have A + B, lets add A and B.

∴ A + B = loga30 + (-loga(5/3)) 

= loga30 – loga(5/3) = loga(30 × 3/5) 

= loga(18) = loga(2 × 32)

⇒ A + B = loga(2) + 2loga(3)

⇒ A + B = 3 + 2loga(3) [∵ log2a = 1/3 ∴ loga2 = 3]

⇒ loga(3) = (A + B - 3)/2

⇒ log3(a) = 2/(A + B - 3)

Hence, option (c).

Test: Logarithm- 2 - Question 9

The real root of the equation 26x + 23x+2 - 21 = 0 is

Detailed Solution for Test: Logarithm- 2 - Question 9

Given: 26x + 23x+2 - 21 = 0

Replace 23x with y

So, 26x = y2

Now, 26x + 23x+2 - 21 = 0 can be rewritten as y2 + 22 × 23x - 21 = 0

y2 + 4y - 21 = 0

Solving the above quadratic equation,

(y + 7) (y - 3) = 0

So, y = -7 or +3

y = - 7 is rejected (since, y = 23x which should always be positive)

⇒ 23x = 3

Taking log on both sides,

log2⁡3 = 3x 

Hence, option (a).

Test: Logarithm- 2 - Question 10

If x >= y and y > 1, then the value of the expression logx(x/y) + logy(y/x) can never be

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