The least integral value of f(x)=((x-1)7+3(x-1)6+(x-1)5+1/(x-1)5) ∀ x1, is equal to

Question

The least integral value of f(x)=((x-1)7+3(x-1)6+(x-1)5+1/(x-1)5) ∀ x>1, is equal to (A) 3 (B) 4 (C) 5 (D) 6

Tardigrade Admin · Accepted Answer

Let x -1= t >0 ∴ f ( x )=( t 7+3 t 6+ t 5+1/ t 5)= t 2+3 t +1+(1/ t 5) Θ text A.M. ≥ GM . .⇒ ( t 2+ t + t + t +1+(1/ t 5)/6) ≥ √[6] t 2 ⋅ t ⋅ t ⋅ t ⋅ 1 ⋅ (1/ t 5) ] ⇒ f ( x ) ≥ 6 ∴ text least integral value =6

Q. The least integral value of f(x)=(x−1)5(x−1)7+3(x−1)6+(x−1)5+1​∀x>1, is equal to

3

4

5

6

Let x−1=t>0 ∴f(x)=t5t7+3t6+t5+1​=t2+3t+1+t51​<br/>Θ A.M. ≥GM. ⇒6t2+t+t+t+1+t51​​≥6t2⋅t⋅t⋅t⋅1⋅t51​​] ⇒f(x)≥6 ∴ least integral value =6

Q. The least integral value of $f (x) = \frac{( x - 1 ) ^{7} + 3 ( x - 1 ) ^{6} + ( x - 1 ) ^{5} + 1}{( x - 1 ) ^{5}} \forall x > 1$ , is equal to