Question:
If aa is the greatest term in the sequence \(a_n=\frac{n^3}{n^4+147},n=1,2,3,...,\) then a is equal to______________.
If aa is the greatest term in the sequence \(a_n=\frac{n^3}{n^4+147},n=1,2,3,...,\) then a is equal to______________.
Show Hint
For maxima/minima in sequences, differentiate and solve for critical points.
Updated On: Mar 21, 2025
Hide Solution
Verified By Collegedunia
Correct Answer: 5
Solution and Explanation
Step 1: Define \(f(x)\) and find the derivative.
\[ f(x) = \frac{x^3}{x^4 + 147}, \quad f'(x) = \frac{3x^2(x^4 + 147) - x^3(4x^3)}{(x^4 + 147)^2}. \] Step 2: Solve \(f'(x) = 0\).
\[ 3x^6 + 441x^2 - 4x^6 = 0 \implies x^2(441 - x^4) = 0. \] \[ x = \sqrt[4]{441} \approx 3.5. \] Step 3: Find \(f(3.5)\).
\[ f(3.5) = \frac{(3.5)^3}{(3.5)^4 + 147} \approx 0.158. \] Final Answer: The greatest term is \(0.158\).
\[ a = 5 \]
\[ f(x) = \frac{x^3}{x^4 + 147}, \quad f'(x) = \frac{3x^2(x^4 + 147) - x^3(4x^3)}{(x^4 + 147)^2}. \] Step 2: Solve \(f'(x) = 0\).
\[ 3x^6 + 441x^2 - 4x^6 = 0 \implies x^2(441 - x^4) = 0. \] \[ x = \sqrt[4]{441} \approx 3.5. \] Step 3: Find \(f(3.5)\).
\[ f(3.5) = \frac{(3.5)^3}{(3.5)^4 + 147} \approx 0.158. \] Final Answer: The greatest term is \(0.158\).
\[ a = 5 \]
Was this answer helpful?
0
0
Top Questions on sequences
- 10, 30, 68, 130, ___ ,350
find the missing number? - Let be a sequence such that a1+a2+....+ an=\(\frac{n^2+3n}{ (n+1 ) (n+2)}\). If \(28∑^{10}_{k=1}\frac{1}{a_k} =\) P1P2P3 . . . Pm , where p1, p2, …..pm are the first m prime numbers, then m is equal to
- Let $a_1=8, a_2, a_3, \ldots, a_n$ be an AP If the sum of its first four terms is $50$ and the sum of its last four terms is $170$ , then the product of its middle two terms is______
- Using mathematical induction, the numbers $ a_n $ are defined by $ a_0 = 1, a_{n+1} = 3n^2 + n + a_n, (n \geq 0) $. Then, $ a_n $ is equal to
- The statement $(p \wedge(\sim q)) \Rightarrow(p \Rightarrow(\sim q))$ is
View More Questions
Questions Asked in JEE Main exam
- In an experiment, a set of readings are obtained as follows: \[ 1.24~\text{mm},\ 1.25~\text{mm},\ 1.23~\text{mm},\ 1.21~\text{mm}. \] The expected least count of the instrument used in recording these readings is _______ mm.
- JEE Main - 2026
- General Physics
Method used for separation of mixture of products (B and C) obtained in the following reaction is:
- JEE Main - 2026
- p -Block Elements
- The number of numbers greater than $5000$, less than $9000$ and divisible by $3$, that can be formed using the digits $0,1,2,5,9$, if repetition of digits is allowed, is
- JEE Main - 2026
- Permutations
- Two point charges of \(1\,\text{nC}\) and \(2\,\text{nC}\) are placed at two corners of an equilateral triangle of side \(3\) cm. The work done in bringing a charge of \(3\,\text{nC}\) from infinity to the third corner of the triangle is ________ \(\mu\text{J}\). \[ \left(\frac{1}{4\pi\varepsilon_0}=9\times10^9\,\text{N m}^2\text{C}^{-2}\right) \]
- JEE Main - 2026
- Electrostatics
- Evaluate: \[ \frac{6}{3^{26}}+\frac{10\cdot1}{3^{25}}+\frac{10\cdot2}{3^{24}}+\frac{10\cdot2^{2}}{3^{23}}+\cdots+\frac{10\cdot2^{24}}{3}. \]
- JEE Main - 2026
- Integral Calculus
View More Questions