given the x+2 and 3x-1 are factors of the expression 3x^3-10x^2+px+q, find the values of p and q. Hence, find the third factor of the expression. I already found that p=-27...
Use the Remainder Theorem to find the remainder that occurs when P(x) = 5x4 + 2x3 − 5x2 − 2x + 1 is divided by the binomial. x − 1
Use the Remainder Theorem to find the remainder when P(x) = 2x4 + 5x3 − 4x2 − 2x + 3 is divided by the binomial. x + 1
a) What is the polynomial f(x)=x^3+2x^2-6x-9 divided by x-2? b) What is f(2)
I need answer for this question.
The polynomial P(x) has remainders 10 and 1 when it is divided by x+2 and x-1 respectively. Find the remainder, in the form of ax+b when P(x) is divided by x^2 + x - 2.
Don't know the anwser to this question that Well don't really understand how to do the remainder therom
using synthetic division and the remainder theorem to find the indicated function value. f(x)=5x^3-11x^2+3x-7; f(2)
a) f(x) divided by x+3 b) x+3 is a _______ (factor??) c) f(-3)=______ d) _____ is the quotient
Find p and q. Please explain the remainder theorem and factor theorem.
An integer X, when divided by 4 or 6, results in a remainder of 1. Which of the followimg cannot be a remainder when the same number is divided by 9. A 2 B 3 C 7 D 4 E...
calculate the value of k when 2x3+4kx2-3k2x-2 divided by x-k gives a remainder of 10
When f(x) is divided by x-1 and x+2, the remainders are 4 and -2 respectively.hence find the remainder when f(x) is divided by (x^2)+x-2. please help :) thanks
It uses the remainder theorem.
What number when divisible by 7 gives a remainder of 4, when divisible by 8 gives a remainder of 5 and when divisible by 9 gives a remainder of 6?
Given that x^5+ax^3+bx^2-3=(x^2-1)Q(x)-x-2, where Q(x) is a polynomial. State the degree of Q(x) and find the value of a and b. Find also the remainder when Q(x) is divide by x+2.
Suppose h(t) = -5t^2+15t+1 represents the approximate height in metres of a javelin t seconds after it is thrown. Write a statement that corresponds to the quoteint h(t)/(t-b) where...
it is another maths of remainder problem. how could i find c????