If the polynomials az3+ 4z3+ 3z – 4 and z3– 4z + a leave the same remainder when divided by z – 3, find the value of a.
Answers
Answer:
Hey mate, here is ur answer!!!
Step-by-step explanation:
Let f(z) = az³+4z²+3z-4
zero of the polynomial (z-3) = 3
(since,z-3=0⇒z=3)
So,replacing z by 3,
f(3) = a(3)³+4(3)²+3(3)-4
⇒f(3) = 27a+36+9-4
⇒f(3) = 27a+41
Let g(z) = z³-4z+a
zero of the polynomial (z-3) = 3
(since,z-3=0⇒z=3)
So,replacing z by 3,
g(3) = (3)³-4(3)+a
⇒g(3) = 27-12+a
⇒g(3) = 15+a
Given that the two polynomials leaves same remainder when divided by z-3
So,g(3)=f(3)
⇒15+a = 27a+41
⇒15-41 = 27a - a
⇒-26 = 26a
⇒a = -1.
Hope it helps you
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Let f(z) = az³+4z²+3z-4
zero of the polynomial (z-3) = 3
(since,z-3=0⇒z=3)
So,replacing z by 3,
f(3) = a(3)³+4(3)²+3(3)-4
⇒f(3) = 27a+36+9-4
⇒f(3) = 27a+41
Let g(z) = z³-4z+a
zero of the polynomial (z-3) = 3
(since,z-3=0⇒z=3)
So,replacing z by 3,
g(3) = (3)³-4(3)+a
⇒g(3) = 27-12+a
⇒g(3) = 15+a
Given that the two polynomials leaves same remainder when divided by z-3
So,g(3)=f(3)
⇒15+a = 27a+41
⇒15-41 = 27a - a
⇒-26 = 26a
⇒a = -1