without actual division prove that p(x)= x⁴+2x³ -2x²-2x-3 is exactly divisible by g(x)= x²+2x-3 About the author Ayla
Step-by-step explanation: g(x) = x²+2x – 3 = 0 x² + 3x – x +3 =0 x(x + 3) – 1(x + 3) =0 (x+3) (x–1) = 0 x + 3= 0. : x –1=0 x = –3. : x= 1 p(x)= x⁴+2x³ –2x²–2x –3 p(–3) = (–3)⁴ + 2(–3)³ – 2(–3)² – 2(–3) –3 = 81 + (–54) – (18) – (–6) – 3 = 81 –54 –18 + 6–3 = 87 – 75 = 12 p(1) = x⁴+ 2x³–2x²–2x–3 = 1⁴ +2(1)³ –2(1)²– 2(1) –3 = 1 +2 – 2 – 2 –3 = –4 I Hope its helpful Reply
Step-by-step explanation:
g(x) = x²+2x – 3 = 0
x² + 3x – x +3 =0
x(x + 3) – 1(x + 3) =0
(x+3) (x–1) = 0
x + 3= 0. : x –1=0
x = –3. : x= 1
p(x)= x⁴+2x³ –2x²–2x –3
p(–3) = (–3)⁴ + 2(–3)³ – 2(–3)² – 2(–3) –3
= 81 + (–54) – (18) – (–6) – 3
= 81 –54 –18 + 6–3
= 87 – 75
= 12
p(1) = x⁴+ 2x³–2x²–2x–3
= 1⁴ +2(1)³ –2(1)²– 2(1) –3
= 1 +2 – 2 – 2 –3
= –4
I Hope its helpful