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Binomial Theorem

Multiple Choice Questions

231.

The coefficient of x⁴ in the expansion of log (1 + 3x + 2x²) is

$\frac{16}{3}$
$- \frac{16}{3}$
$\frac{17}{4}$
$- \frac{17}{4}$

232.

If m = ${}^{n}C_{2}$ , then ${}^{m}C_{2}$ is equal to

$n + {}^{1}C_{4}$
$3 \times {}^{n}C_{4}$
$3 \times {}^{n + 1}C_{4}$
None of these

233.

The largest term in the expansion of (3 + 2x)⁵⁰ where x = $\frac{1}{5}$ , is

7th
5th
8th
49th

234.
The coefficient of x⁴ in (1 + x + x³ + x⁴)¹⁰ is

210

100

310

110

310

$Let E = {(1 + x + x^{3} + x^{4})}^{10} = {[1 + x + x^{3} (1 + x)]}^{10} = {(1 + x)}^{10} {(1 + x^{3})}^{10} = [{}^{10}C_{0} + {}^{10}C_{1} x^{1} + {}^{10}C_{2} x^{2} + . . . + {}^{10}C_{9} x^{9} + {}^{10}C_{10} x^{10}] \times [{}^{10}C_{0} 1 + {}^{10}C_{1} 1 \times (x^{3}) + {}^{10}C_{2} {(x^{3})}^{2} + {}^{10}C_{3} {(x^{3})}^{3} + . . .] ∴ Coefficient of x^{4} in E = {}^{10}C_{4} \times {}^{10}C_{0} + {}^{10}C_{1} \times {}^{10}C_{1} = \frac{10!}{6! \times 4!} \times 1 + 10 \times 10 = \frac{10 \times 9 \times 8 \times 7}{4 \times 3 \times 2 \times 1} = 210 + 100 = 310$