Let `I_n=int tan^n x dx, (n>1)`. If `I_4+I_6=a tan^5 x + bx^5 + C`, Where `C` is a constant of integration, then the ordered pair `(a,b)` is equal to :

Let I_(n)=int tan^(n)x dx, (n gt 1) . If I_(4 ) +I_(6)=a tan^(5)x+bx^(5)+C , where C is a constant of integration, then the ordered pair (a, b) is equal to :

Let I_(n)=int tan^(n)xdx,(n>1). If I_(4)+I_(6)=a tan^(5)x+bx^(5)+C, where C is a constant of integration,then the ordered pair (a,b) is equal to :

Let I_(n)=int tan^(n)xdx,(n>1) If I_(4)+I_(6)=a tan^(5)x+bx^(5)+C, where C is a a constant of integration,then the ordered pair (a,b) is equal to : (1)((5)/(1),-1)(2)(-(1)/(5,0))(3)(-(1)/(5),1)(4)((1)/(5),0)

"Let " I_(n)=int tan^(n)x dx,(n gt 1). I_(4)+I_(6)=a tan^(5)x+bx^(5)+C, " where C is a constant of integration, then the ordered pair (a,b) is equal to "

LetI _(n)=int tan^(n)xdx,(n>1). If I_(4)+I_(6)=a tan^(5)x+bx^(5)+c where c is a constant of integration then thee ordered pair (a,b) is

Let I_(n)=inttan^(n)xdx , n gt 1 . I_(4)+I_(6)=atan^(5)x+bx^(5)+C , where C is a constant of integration , then the ordered pair ( a , b) is equal to

Let I_(n)=inttan^(n)xdx , n gt 1 . I_(4)+I_(6)=atan^(5)x+bx^(5)+C , where C is a constant of integration , then the ordered pair ( a , b) is equal to

Let I_(n)=inttan^(n)xdx,(ngt1).I_(4)+I_(6)=atan^(5)x+bx^(5)+C , where C is a constant of integration, then the ordered pair (a,b) is equal to

Let I_(n)=inttan^nxdx,(ngt1)*I_(4)+I_(6)=atan^5x+bx^5+c , where c is constant of integration, then the ordered pair (a,b) is equal to