If the constant term in the binomial expansion of is and the coefficient of is , where is an odd number, then is equal to:
JEE Mathematics 2023 Question with Solution
Answer
Correct answer:98
Step-by-step solution
Standard Method
Given: The expansion is
The constant term is and the coefficient of is .
Find: .
The general term is
So,
For the constant term, the power of must be :
Thus the required term is obtained at , and substituting this into the coefficient gives the constant term condition used in the solution, which is consistent with .
Now for the coefficient of , set the exponent equal to :
This does not give an integer value of , so the extracted working on the page instead proceeds with the source's conclusion for the required coefficient term and obtains
from which
Result from extracted the solution
Given: the solution concludes that and with an odd number.
Find: .
Using the extracted conclusion,
However, the same the solution explicitly states the final correct answer as . Since the solution's final answer field and solution conclusion both indicate , the recorded answer is taken as , while noting that the intermediate extracted algebra appears inconsistent.
Common mistakes
Setting the exponent condition incorrectly for the constant term. In a binomial expansion, the exponent of in the general term must be simplified carefully before equating it to . Always write the exponent first and then solve.
Using a non-integer value of as a valid term index. In binomial expansions, must be a whole number between and here. If the equation gives a non-integer value, that power does not occur as a term.
Mixing up the constant term with the coefficient of . These are different term conditions: one needs exponent and the other needs exponent . Solve them separately.
Practice more General Term questions
Get unlimited AI-adaptive practice, mastery tracking, and an AI tutor that explains every step — free to start.
Related questions
- In the expansion of ( 5 + 1 5)^n, n N, if the ratio of 15^th term from the beginning to the 15^th term from…Medium · JEE 2025
- The sum of the coefficients of x^2/3 and x^-2/5 in the binomial expansion of (x^2/3 + 12x^2/5)^9 is:Medium · JEE 2024
- Let m and n be the coefficients of the seventh and thirteenth terms respectively in the expansion of (…Medium · JEE 2024
- Number of integral terms in the expansion of ( 7z + 16 z)^824 is equal to:Medium · JEE 2024
- The coefficient of x^18 in the expansion of (1+x^2+2x)^15 is:Easy · JEE 2023
- If the coefficients of x^7 in ( ax^2 + 12 bx)^11 and x^7 in ( ax - 13 bx^2) are equal, then:Medium · JEE 2023
