1 1 + x^ a - b + x^ a - c =

MCQ

$\sum {{1 \over {1 + {x^{a - b}} + {x^{a - c}}}} = } $

✓
$1$
B
$-1$
C
$0$
D
None of these

✓

Answer

Correct option: A.

$1$

a
(a) $\sum\limits_{}^{} {{1 \over {1 + {x^{a - b}} + {x^{a - c}}}} = \sum\limits_{}^{} {{{{x^{b + c}}} \over {{x^{b + c}} + {x^{c + a}} + {x^{a + b}}}}} } $

= ${1 \over {{x^{b + c}} + {x^{c + a}} + {x^{a + b}}}}\sum\limits_{}^{} {{x^{b + c}}} $

= ${1 \over {{x^{b + c}} + {x^{c + a}} + {x^{a + b}}}}\,({x^{b + c}} + {x^{c + a}} + {x^{a + b}}) = 1$.

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