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प्रश्न
Using binomial theorem evaluate .
(iv) (98)5
उत्तर
\[(100 - 2 )^5 \]
\[ =^{5}{}{C}_0 \times {100}^5 \times 2^0 + -^5 C_1 \times {100}^4 \times 2^1 + ^{5}{}{C}_2 \times {100}^3 \times 2^2 - ^{5}{}{C}_3 \times {100}^2 \times 2^3 + ^{5}{}{C}_4 \times {100}^1 \times 2^4 -^{5}{}{C}_5 \times {100}^0 \times 2^5 \]
\[ = 10000000000 - 1000000000 + 40000000 - 800000 + 8000 - 32\]
\[ = 9039207968\]
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संबंधित प्रश्न
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\[= ^{5}{}{C}_0 (2x )^5 (3y )^0 +^{5}{}{C}_1 (2x )^4 (3y )^1 + ^{5}{}{C}_2 (2x )^3 (3y )^2 + ^{5}{}{C}_3 (2x )^2 (3y )^3 + ^{5}{}{C}_4 (2x )^1 (3y )^4 +^{5}{}{C}_5 (2x )^0 (3y )^5\]
\[= 32 x^5 + 5 \times 16 x^4 \times 3y + 10 \times 8 x^3 \times 9 y^2 + 10 \times 4 x^2 \times 27 y^3 + 5 \times 2x \times 81 y^4 + 243 y^5 \]
\[ = 32 x^5 + 240 x^4 y + 720 x^3 y^2 + 1080 x^2 y^3 + 810x y^4 + 243 y^5 \]
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