Find the reminder when x4+x3−2x2+x+1x^4+x^3-2x^2+x+1x4+x3−2x2+x+1is divided by x−1x-1x−1 A2B0C1D3Answer: A. 2 Read Explanation: when a polynomial p(x) is divided by (x - a) for some number a , the reminder r = p(a)When p(a) = 0 then (x -a) is a factor of p(x) p(x)=x4+x3−2x2+x+1p(x)=x^4+x^3-2x^2+x+1p(x)=x4+x3−2x2+x+1x−1=0x-1=0x−1=0 ⟹ x=1\implies{x=1}⟹x=1p(1)=14+13−2×12+1+1p(1)=1^4+1^3-2\times1^2+1+1p(1)=14+13−2×12+1+1=1+1−2+1+1=1+1-2+1+1=1+1−2+1+1=2=2=2Reminder r = 2 Read more in App
