The independent term of x is 80000 in the expansion of (3x+b/x)^6, where b is a positive constant. What the value of b?(a) 3.97(b) 6.87(c) 8.3(d) 5.2I have been asked this question by my school principal while I was bunking the class.Enquiry is from Counting topic in division Counting of Discrete Mathematics

The independent term of x is 80000 in the expansion of (3x+b/x)^6, whe

1.	The independent term of x is 80000 in the expansion of (3x+b/x)^6, where b is a positive constant. What the value of b?(a) 3.97(b) 6.87(c) 8.3(d) 5.2I have been asked this question by my school principal while I was bunking the class.Enquiry is from Counting topic in division Counting of Discrete Mathematics
Answer» Correct CHOICE is (d) 5.2 Explanation: By using the BINOMIAL Theorem, the terms are of the form ^6CN * (4x)^6-n * (B/x)^n. For the term to be independent of x, we need x^6-n(1/x)^n = x^0⇒ x^6-n(x-1)^n = x^0⇒ x^6-nx^-n = x^0 ⇒ 6 – n = n ⇒ 2n = 6 and n = 3. Thus, we have a CONSTANT term of ^6C3 * 3^3 * b^3 = 8000 20 * 27 * b^3 = 80000 540 * b^3 = 80000 b^3 = 148.14 ⇒ b= 5.2.

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