If n is a positive integer, then is from Mathematics Binomia

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Binomial Theorem

Short Answer Type

171. The coefficients of the (r - 1)^th, r^th and (r + 1)^th terms in the expansion of (x + 1)ⁿ are in the ratio 1 : 3 : 5. Find n and r.

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Long Answer Type

172.

Find the absolute term in the expansion of: $open parentheses straight x minus 1 over straight x squared close parentheses to the power of 3 straight n end exponent$

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173. The co-efficients of a^r-1, a^r and a^r+1 in the expansion of (1 + a)ⁿ are in arithmetic progression, Show that n² - n(4r + 1) + 4r² - 2 =0.

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Multiple Choice Questions

174.

The sum of coefficients of integral powers of x in the binomial expansion of $left parenthesis 1 minus 2 square root of straight x right parenthesis to the power of 50 space$ is

$1 half left parenthesis 3 to the power of 50 space plus space 1 right parenthesis$
$1 half left parenthesis 30 to the power of 50 right parenthesis$
$1 half left parenthesis 30 to the power of 50 minus 1 right parenthesis$
$1 half left parenthesis 30 to the power of 50 minus 1 right parenthesis$

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175.

If (10)⁹ +2 (11)²(10)⁷ + .....+10 (11)⁹ = K(10)⁹, then k is equal to

121/10
441/100
100
100

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176.

A multiple choice examination has 5 questions. Each question has three alternative answers of which exactly one is correct. The probability that a student will get 4 or more correct answers just by guessing is

17/3⁵
13/3⁵
11/3⁵
11/3⁵

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177.

The term independent of x in $open parentheses fraction numerator straight x plus 1 over denominator straight x to the power of 2 divided by 3 end exponent minus straight x to the power of 1 divided by 3 end exponent space plus 1 end fraction minus fraction numerator straight x minus 1 over denominator straight x minus straight x to the power of 1 divided by 2 end exponent end fraction close parentheses to the power of 10$ is

4
120
18
18

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178.
If n is a positive integer, then $open parentheses square root of 3 plus 1 close parentheses to the power of 2 straight n end exponent minus space left parenthesis square root of 3 minus 1 right parenthesis to the power of 2 straight n end exponent space$ is

an irrational number

an odd positive integer

an even positive integer

an even positive integer

A.

an irrational number

left parenthesis straight x plus straight a right parenthesis to the power of straight n space equals space to the power of straight n straight C subscript straight o space straight x to the power of straight n space plus to the power of straight n straight C subscript 1 straight x to the power of straight n minus 1 end exponent space straight a space plus to the power of straight n straight C subscript 1 straight x to the power of straight n minus 2 end exponent straight a squared space plus..... plus straight n space to the power of straight n straight C subscript straight n straight a to the power of straight n and left parenthesis straight x minus straight a right parenthesis to the power of straight n space equals space to the power of straight n straight C subscript straight o space straight x to the power of straight n space minus to the power of straight n straight C subscript 1 straight x to the power of straight n minus 1 end exponent space straight a space plus to the power of straight n straight C subscript 1 straight x to the power of straight n minus 2 end exponent straight a squared space plus..... plus left parenthesis negative 1 right parenthesis straight n space to the power of straight n straight C subscript straight n straight a to the power of straight n left parenthesis square root of 3 plus 1 end root right parenthesis to the power of 2 straight n end exponent space equals space to the power of 2 straight n end exponent straight C subscript straight o space left parenthesis square root of 3 right parenthesis to the power of 2 straight n end exponent space plus to the power of 2 straight n end exponent straight C subscript 1 left parenthesis square root of 3 right parenthesis to the power of 2 straight n minus 1 end exponent space plus to the power of 2 straight n end exponent straight C subscript 2 space left parenthesis square root of 3 right parenthesis to the power of 2 straight n minus 2 end exponent space plus........ plus to the power of 2 straight n end exponent straight C subscript 2 straight n end subscript left parenthesis square root of 3 right parenthesis to the power of 2 straight n minus 2 straight n end exponent left parenthesis square root of 3 minus 1 end root right parenthesis to the power of 2 straight n end exponent space equals space to the power of 2 straight n end exponent straight C subscript straight o space left parenthesis square root of 3 right parenthesis to the power of 2 straight n end exponent space left parenthesis negative 1 right parenthesis to the power of 0 plus to the power of 2 straight n end exponent straight C subscript 1 left parenthesis square root of 3 right parenthesis to the power of 2 straight n minus 1 end exponent space left parenthesis negative 1 right parenthesis squared space plus to the power of 2 straight n end exponent straight C subscript 2 space left parenthesis square root of 3 right parenthesis to the power of 2 straight n minus 2 end exponent left parenthesis negative 1 right parenthesis squared space plus........ plus to the power of 2 straight n end exponent straight C subscript 2 straight n end subscript left parenthesis square root of 3 right parenthesis to the power of 2 straight n minus 2 straight n end exponent left parenthesis negative 1 right parenthesis to the power of 2 straight n end exponent

Adding both the binomial expansions above, we get

left parenthesis square root of 3 plus 1 right parenthesis to the power of 2 straight n end exponent space minus space left parenthesis square root of 3 straight n end root minus 1 right parenthesis to the power of 2 straight n end exponent space equals space 2 left square bracket to the power of 2 straight n end exponent straight C subscript 1 left parenthesis square root of 3 right parenthesis to the power of 2 straight n minus 1 end exponent plus to the power of 2 straight n end exponent straight C subscript 3 space left parenthesis square root of 3 right parenthesis to the power of 2 straight n minus 3 end exponent space plus to the power of 2 straight n end exponent straight C subscript 5 space left parenthesis square root of 3 right parenthesis to the power of 2 straight n minus 5 end exponent space plus....... space plus to the power of 2 straight n end exponent straight C subscript 2 straight n minus 1 end subscript space left parenthesis square root of 3 right parenthesis to the power of 2 straight n minus left parenthesis 2 straight n minus 1 right parenthesis end exponent right square bracket

It is the irrational number because of odd power of

square root of 3

appears in each of the terms.

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179.

The coefficient of x⁷ in the expansion of (1 - x - x² +x³)⁶ is :

144
-132
-144
-144

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180.

The value of
(²¹C₁ – ¹⁰C₁) + (²¹C₂ – ¹⁰C₂) + (²¹C₃ – ¹⁰C₃) + (²¹C₄ – ¹⁰C₄) + .... +
(²¹C₁₀ – ¹⁰C₁₀) is

2²⁰ – 2¹⁰
2²¹ – 2¹¹
2²¹ – 2¹⁰
2²¹ – 2¹⁰

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