If dx=A(x)+c, for a suitable chosen integer m and a function A (x), where C is a constant of integration then (A(x))m equals |
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(a) |
(b) |
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(c) |
(d) |
If dx=A(x)+c, for a suitable chosen integer m and a function A (x), where C is a constant of integration then (A(x))m equals |
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(a) |
(b) |
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(c) |
(d) |
dx=A(x)+c
put
case-I x ≥ 0
⇒+c
⇒
⇒
A(x)= and m=3
(A(x))m=
Case-II x
We get+c
A(x)=
(A(x))m=