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- SOLUTION: Could you please explain what a linear factor is and how it . . .
First of all, a linear factor is a factor whose highest power of the variable is 1 In your example here because you have an x^2 as the highest power of x in the problem, it is said to be quadratic It is NOT linear Linear factors would be like: 3x + 2, x-4, -2x+3, etc Secondly, you have given an expression, NOT an equation
- f(x)= x^3-x^2-10x+6 - Algebra Homework Help
-3 is a zero -3 | 1 -1 -10 6 |-3 12 -6 1 -4 2 0 So we have factored f(x) as Now we must factor into two linear factors We find its zeros by setting it equal to 0 so the other two zeros are and So the remaining linear factors are and Edwin
- For the polynomial below, is a zero. Express as a product of linear . . .
By Factor Theorem g(x) = x^3+9x^2+20x +6 has factor x-(-3) = x +3 Let perform synthetic division-3| 1 9 20 6
- g(x)=x^3 -2x^2 -11x -6 - Algebra Homework Help
SOLUTION: For the polynomial below, -2 is a zero g(x)=x^3 -2x^2 -11x -6 Express g(x) as a product of linear factors
- Express g (x) as a product of linear factors - Wyzant
x+3 is linear but x 2-6x+4 is quadratic To make the quadratic into 2 linear factors we can use of quadratic formula: To make the quadratic into 2 linear factors we can use of quadratic formula: x= [6± √(36 - 16)] 2
- For the polynomial below, 1 is zero. Express f (x) as a . . . - Wyzant
but you want linear factors x^2+6x+13 doesn't factor easily x^2 +6x + 9 + 13-9= 0 by completing the
- factor f(x) into linear factors given that k is a zero of f(x)
Algebra -> Coordinate Systems and Linear Equations -> SOLUTION: Can I please get assistance with the following problem? factor f(x) into linear factors given that k is a zero of f(x) f(x)=x^3-6x^2-25x+150;k=5 THANK YOU!! Log On
- F(x)= x^3+7x^2+24x+18 - Algebra Homework Help
SOLUTION: For the polynomial below, -1 is a zero F(x)= x^3+7x^2+24x+18 Express f(x) as a product of linear factors f(x)=
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