dividing polynomials
transformations
adding, subtracting,multiplying, and dividing radicals
100

is (x+2) a factor of 5x3+5x2+5x+3

5x2-5x+15 (is not a factor)

100

Describe the transformation

f(x)=a (x-h)2+k = f(x)=2√ x-9

Vertical stretch, down 9

100

10 √28 +3√-56 -4√175

-23√7

200

is (x-1) a factor of 2x3-15x2-32x+45

2x2-13x- 45 (is a factor)

200

f(x)=√ x-7+2

to the right 7, up 2

200

74√48 - 24√3  33√72

124√3+6 3√9

300

-x3+4x2+9/ x-3

-x2+x+3+ 18/x-3

300

f(x)=1/2 √ x-2-6

vert compression to the right 2, down 6

300

3√10-2√18

-36√5

400

is (x+1) a factor of x3-4x2-x+4

(x+1) (x-1) (x-4) (is a factor)

400

-3√ x+5+3

5units to the left, 3 units up, vertical compression

400

(8-√10) (3-10)

34-11√10

500

2x4+3x3+5x-1/x23x+2

2x2-2x+2+ 3x-5/x2+3x+2

500

The cube root parent function is reflected across the x-axis, vertically stretched by a factor of 3 then translated 8 down

-33√ x-8

500

4/ 4+√2

16-4√2/14

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