The values of constants a and b so thatlimx→∞(x2+1x+1−ax−b)=12,are
a=1,b=−32
a=−1,b=32
a=0, b=0
a =2, b= -1
limx→∞(x2+1x+1−ax−b)=12⇒limx→∞(x2+1)−(ax+b)(x+1)x+1=12⇒limx→∞x2(1−a)−(a+b)x−b+1x+1=12⇒1−a=0 and a+b=−12∴a=1 b=−32