`int (px^(p+2q-1)-qx^(q-1))/(x^(2p+2q)+2x^(p+q)+1) dx` is equal to(1) `-x^p/(x^(p+q)+1)+C` (2) `x^q/(x^(p+q)+1)+C` (3) `-x^q/(x^(p+q)+1)+C` (4) `x^p/(x^(p+q)+1)+C` A. ` -(x^(p))/(x^(p+q)+1)+C`B. ` (x^(q))/(x^(p+q)+1)+C`C. ` -(x^(q))/(x^(p+q)+1)+C`D. ` (x^(p))/(x^(p+q)+1)+C`

`int (px^(p+2q-1)-qx^(q-1))/(x^(2p+2q)+2x^(p+q)+1) dx` is equal to(1)�

1.	`int (px^(p+2q-1)-qx^(q-1))/(x^(2p+2q)+2x^(p+q)+1) dx` is equal to(1) `-x^p/(x^(p+q)+1)+C` (2) `x^q/(x^(p+q)+1)+C` (3) `-x^q/(x^(p+q)+1)+C` (4) `x^p/(x^(p+q)+1)+C` A. ` -(x^(p))/(x^(p+q)+1)+C`B. ` (x^(q))/(x^(p+q)+1)+C`C. ` -(x^(q))/(x^(p+q)+1)+C`D. ` (x^(p))/(x^(p+q)+1)+C`
Answer» Correct Answer - C `int(px^(p+2q-1)-qx^(q-1))/((x^(p+q)+1)^(2))dx=int(px^(p-1)-qx^(q-1))/((x^(p)+x^(-q))^(2))dx " " ("Dividing "N^(r)" and "D^(r) " by "x^(2q))` `=int(dt)/(t^(2))= -(1)/(t)+C, " where " t=x^(p)+x^(-q)` `= - (1)/(x^(p)+x^(-q))+C` `= -(x^(q))/(x^(p+q)+1)+C`

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