Find the value of n C 1- n C 5- n C 9- n C 13- - -A- 2n-1-2sin n-4-2 n -2B- 2-2sin-4-2n-1C- 2n-21-sin-4D- 2n-2-2sinn -4-2n-2

The correct option is D 2^n 2/2sin nπ/4+ 2^n 2 we have ( 1+x)^n =^n C_0 +^nC_1x +^n C_2 x^2 +^nC_3 x^3+^nC_4 x^4+.... Putting x = 1; 2^n = ^nC_0 +^nC_1+ ^nC_ ...

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Byju's Answer

Standard XI

Mathematics

Sum of binomial coefficients with alternate signs

Find the valu...

Question

Find the value of $^{n} C_{1} +^{n} C 5 +^{n} C 9 +^{n} C_{13} . . . . .$

2^{n - 2} (1 + s i n \frac{n π}{4})

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2^{\frac{n - 2}{2}} s i n \frac{n π}{4} + 2^{n - 2}

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2^{\frac{n - 1}{2}} s i n \frac{n π}{4} + 2^{n - 2}

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2^{\frac{n}{2}} s i n \frac{n π}{4} + 2^{n - 1}

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Solution

The correct option is B $2^{\frac{n - 2}{2}} s i n \frac{n π}{4} + 2^{n - 2}$
we have $(1 + x)^{n} =^{n} C_{0} +^{n} C_{1} x +^{n} C_{2} x^{2} +^{n} C_{3} x^{3} +^{n} C_{4} x^{4} + . . . .$
Putting x = - 1;
$2^{n} =^{n} C_{0} +^{n} C_{1} +^{n} C_{2} +^{n} C_{3} +^{n} C_{4} . . . . - - - (1)$
Putting x = - 1;
$0 =^{n} C_{0} -^{n} C_{1} +^{n} C_{2} -^{n} C_{3} +^{n} C_{4} - . . . . - - - (2)$
subtracting (1)from (2); we get
$2^{n - 1} =^{n} C_{1} +^{n} C 3 + n C_{5} +^{n} C_{7} +^{n} C_{9} + . . . - - - - (3)$
Putting x = i;
$(1 + i)^{n} =^{n} C_{0} +^{n} C_{1} i +^{n} C_{2} i^{2} +^{n} C_{3} i^{3} +^{n} C_{4} i^{4} + . . . \Rightarrow 2^{\frac{n}{2}} (\frac{1}{\sqrt{2}} + i \frac{1}{\sqrt{2}})^{n} =^{n} C_{0} +^{n} C_{1} i +^{n} C_{2} (- 1) +^{n} C_{3} (- i) +^{n} C_{4} i + . . . \Rightarrow 2^{\frac{n}{2}} (c o s \frac{π}{4} + i s i n \frac{π}{4})^{n} = (^{n} C_{0} -^{n} C_{2} +^{n} C_{4} - . . .) + i (^{n} C_{1} -^{n} C_{3} +^{+} C_{5} - . . . .) \Rightarrow 2^{\frac{n}{2}} e^{\frac{i π n}{4}} = (^{n} C_{0} -^{n} C_{2} +^{n} C_{4} - . . .) + i (^{n} C_{1} -^{n} C_{3} +^{+} C_{5} - . . .) \Rightarrow 2^{\frac{n}{2}} (c o s \frac{n π}{4} + i s i n \frac{n π}{4}) = (^{n} C_{0} -^{n} C_{2} +^{n} C_{4} - . . .) + i (^{n} C_{1} -^{n} C_{3} +^{+} C_{5} - . . . .)$
Comparing the inaginary parts;
$\Rightarrow 2^{\frac{n}{2}} s i n \frac{n π}{4} = (^{n} C_{1} -^{n} C_{3} +^{+} C_{5} - . . . .) - - - - (4)$
Adding (3)and (4) ; we get
$^{n} C_{1} +^{n} C_{5} +^{n} C_{9} +^{n} C_{13} . . . . = 2^{\frac{n - 2}{2}} s i n \frac{n π}{4} + 2^{n - 2}$

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Similar questions

Q. Find the value of

^{n} C_{1} +^{n} C 5 +^{n} C 9 +^{n} C_{13} . . . . .

The value of $^{n} C_{0}$ - $^{n} C_{2}$ + $^{n} C_{4}$ - $^{n} C_{6}$ . . . . .

Which of the following is/are true?

(1) $(1 + i)^{n}$ = $2^{\frac{n}{2}}$ $(s i n \frac{n π}{4} + i c o s \frac{n π}{4})$

If $(1 + i)^{n}$ = $^{n} C_{0}$ + $^{n} C_{1}$ i - $^{n} C_{2}$ - $^{n} C_{3}$ i + $^{n} C_{4}$ ...............

(2) $^{n} C_{0}$ - $^{n} C_{2}$ + $^{n} C_{4}$ - $^{n} C_{6}$ ................ = $2^{\frac{n}{2}}$ $s i n \frac{n π}{4}$

(3) $^{n} C_{1}$ - $^{n} C_{3}$ + $^{n} C_{5}$ - $^{n} C_{7}$ ....................= $2^{\frac{n}{2}} c o s \frac{n π}{4}$

Q. We know that if

^{n} C_{0},^{n} C_{1},^{n} C_{2}, \dots,^{n} C_{n}

are binomial coefficients then

(1 + x)^{n} = C_{0} + C_{1} x + C_{2} x^{2} + C_{3} x^{3} + \dots + C_{n} x^{n}

. Various relations among binomial coefficients can be derived by putting

x = 1, - 1, x = i, x = w, where, i = \sqrt{- 1}, w = - \frac{1}{2} + \frac{i \sqrt{3}}{2}

Some other identities can be derived by adding and subtracting two such identities. The expression

(a + i b)^{n}

can be evaluated by using De-Moiver's theorem by putting

a = r cos θ, b = r sin θ

.

The value of

^{n} C_{0} -^{n} C_{2} +^{n} C_{4} -^{n} C_{6} + \dots

must be

$^{n} C_{1}$ + $^{n} C_{3}$ + $^{n} C_{5}$ ..............=

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Find the value of nC1+nC5+nC9+nC13.....

Find the value of $^{n} C_{1} +^{n} C 5 +^{n} C 9 +^{n} C_{13} . . . . .$