Definitions
What is a number or variable in a polynomial that is separated by an addition or subtraction sign
a term
Add the Polynomials
(4x + 9) +(x - 4)
5x + 5
Subtract the polynomials:
(g - 4) - (3g - 6)
-2g + 2
3(3x)
9x
(x + 6) (x + 3)
x2 +9x +18
Simplify:
9n/n9
9/n8
Refers to the highest exponent in a polynomial, or the exponent on a specific term
Degree
DAILY DOUBLE
The number before a variable within a term is called the...
Coefficient
Add the polynomials:
(-3a - 2) + (7a + 5)
4a + 3
Subtract the polynomials:
(-5h - 2) - (7h +6)
-12h - 8
Multiply the Polynomials:
(3x)(2y)
6xy
(3x - 4)(2x + 5)
6x2 + 7x - 20
Simplify:
8k7/4k
2k6
Find the perimeter of a rectangle with the dimensions (3v - 10) and (4v +12).
14v + 4
The number in front of the term with the highest exponent.
Leading Coefficient
Add the polynomials:
(x2 +3x + 5) + ( -x2 +6x)
9x + 5
Subtract the polynomials:
(-x2 - 5) - (-3x2 -x -8)
2x2 + x +3
Multiply the Polynomials:
3x2 (2x4 + 4)
6x6 + 12x2
(x - 8)(2x + 3)
2x2 - 13x - 24
Simplify:
(10abcd6)/(2ab7cd)
5d5/b6
Find the area of a rectangle with dimensions (3x) and (4x2).
12x3
The highest exponent on the variables in a term
Degree of the term
Add the polynomials:
(t2 + 3t3 -3) + (2t2 +7t -2t3)
t3 +3t2 +7t -3
Subtract the Polynomials:
(k2 + 6k3 -4) - (5k3 + 7k -3k2)
k3 + 4k2 -7k -4
4x(x-2)^2
4x^3-16x^2+16x
(y + 9) (y + 9)
y2 + 18y + 81
Rewrite this polynomial in standard form
-6a4 + 10a3 + 14a7 - 22a2 + 33
14a7 - 6a4 + 10a3 -22a2 +33
Find the area of a triangle if it has a height of (3x + 9) and a base of (2x - 2).
A = (1/2)bh = (1/2)(2x-2)(3x-9) = (x - 1)(3x-9) = 3x2 -12x+9
Terms that have the same variables and the same degree are....
Like terms
Add the polynomials:
(-1 + x2 + 2x) + (1 -2x + 2x2)
3x2
Subtract the Polynomials:
(2x2 - 3x) - (x2 -2x + 4)
x2 + x - 4
(2x-3y+6)(3y)
6xy-9y2+18y
(x - 12)(x + 12)
x2 - 144
Simplify:
(32x6 + 24x4 - 16x2)/(-2x)
-16x5 - 123 + 8x
Find the area of a room that is (3x - 5) ft by (2x + 1) ft.
6x2 - 7x - 5 ft2