JEE Maths DPP
Fundamentals of Logarithms
DPP : LOG-F-2026-SET01
Part A: Multiple Choice Questions (Single Correct)
-
The value of $\log_{\sqrt{3}} (27)$ is equal to:
- 3
- 6
- 9
- 1.5
-
If $a = \log_{24} 12$, $b = \log_{36} 24$, and $c = \log_{48} 36$, then the value of $1 + abc$ is:
- $2bc$
- $2ac$
- $2ab$
- $ab$
-
Let $x = (0.15)^{20}$. Then the number of zeros between the decimal point and the first non-zero digit in $x$ is (Given $\log_{10} 2 = 0.301, \log_{10} 3 = 0.477$):
- 15
- 16
- 17
- 18
-
The value of $81^{1/\log_5 3} + 27^{\log_9 36} + 3^{4/\log_7 9}$ is:
- 890
- 930
- 750
- 810
-
If $\log_{10} 2 = a$ and $\log_{10} 3 = b$, then $\log_5 12$ in terms of $a$ and $b$ is:
- $\frac{2a+b}{1-a}$
- $\frac{a+2b}{1-a}$
- $\frac{2a+b}{1+a}$
- $\frac{a+b}{1-a}$
-
The solution set of the equation $\log_4 (x^2 – 1) = \log_4 (x-1)$ is:
- $\{0, 1\}$
- $\{-1\}$
- $\{1\}$
- $\emptyset$
-
If $x = \log_a (bc)$, $y = \log_b (ca)$, and $z = \log_c (ab)$, then the value of $\frac{1}{x+1} + \frac{1}{y+1} + \frac{1}{z+1}$ is:
- 0
- 1
- 2
- $abc$
-
The value of $\log_3 2 \cdot \log_4 3 \cdot \log_5 4 \dots \log_{16} 15$ is:
- 1/2
- 1/4
- 1
- 4
-
If $\ln(x)$ represents the natural logarithm, what is the value of $e^{2\ln 3 + \ln 5}$?
- 15
- 30
- 45
- 25
-
The number of real solutions of $\log_2 x + \log_x 2 = 2$ is:
- 0
- 1
- 2
- Infinite
-
The domain of $f(x) = \log_{10}(1-x)$ is:
- $(-\infty, 1)$
- $(1, \infty)$
- $(-\infty, 0)$
- $\mathbb{R}$
-
If $7^{\log_7 (x^2 – 4x + 5)} = x – 1$, then $x$ is:
- 2
- 3
- 2, 3
- None of these
-
The characteristic of $\log_{10} (0.000345)$ is:
- -3
- -4
- 4
- 3
Part B: Subjective Questions
- Solve for $x$: $\log_2 (\log_3 (\log_4 x)) = 0$.
- Prove that $a^{\log b} = b^{\log a}$ where the base of logarithm is any positive real number $c \neq 1$.
Part C: Integer Answer Type
- Find the value of $x$ satisfying $$ \log_3 x + \log_9 x + \log_{27} x = 11. $$
- If $\log_{10} 2 = 0.3010$, find the number of digits in $2^{100}$.
- Find the value of $$ 5^{\log_5 7} + \log_2 128 – \ln e^3. $$
- If $\log_{2} 8 = a$, then find the value of $\log_{4} 64$ in terms of $a$ and calculate it when $a=3$. (Final integer answer required for $a=3$).
- Find the sum of all values of $x$ satisfying $$ \log_{10} x^2 = (\log_{10} x)^2. $$
Part D: Assertion Reason Type
-
Assertion (A): $\log_2 3$ is an irrational number.
Reason (R): If $\log_a b = \frac{p}{q}$, then $a^p = b^q$.- Both A and R are true and R is the correct explanation of A.
- Both A and R are true but R is NOT the correct explanation of A.
- A is true but R is false.
- A is false but R is true.
-
Assertion (A): The value of $\log_{0.5} 4 = -2$.
Reason (R): $\log_a x$ is defined only when $a > 0, a \neq 1$ and $x > 0$.- Both A and R are true and R is the correct explanation of A.
- Both A and R are true but R is NOT the correct explanation of A.
- A is true but R is false.
- A is false but R is true.
Answer Key
| Q1 | Q2 | Q3 | Q4 | Q5 | Q6 | Q7 | Q8 | Q9 | Q10 | Q11 |
|---|---|---|---|---|---|---|---|---|---|---|
| (b) | (a) | (b) | (a) | (d) | (b) | (b) | (b) | (c) | (b) | (a) |
| Q12 | Q13 | Q14 | Q15 | Q16 | Q17 | Q18 | Q19 | Q20 | Q21 | Q22 |
| (a) | (b) | 64 | Proof | 729 | 31 | 11 | $3$ | 101 | (b) | (b) |