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Order of Operations
& Integer Exponents
Polynomials
Rational Expressions
Composing Algebraic Expressions
Linear Equations/Inequalities
100

-2+3/5*(2/3 -2 -:4/5)

-31/10

100

Find the degree of

17x^3+10x^4+600x+5

Degree 4

100

Simplify: (x-1)/x - x/(x-1) 

(-2x+1)/(x^2-x)

100

Bob earns x dollars per hour, Ann earns twice as much.

Compose an algebraic expression (in terms of x) showing how much Ann earns per hour.

2x

100

Solve for x:

2(x+pi)=x+3

x = 3-2pi

200

2^-3 * 2^-2

1/32

200

Simplify (Distribute and combine like terms): (x^2-3x+1)(x-2) 

x^3-5x^2+7x-2

200

Simplify: x+1/(3x) 

(3x^2+1)/(3x)

200

The length of one side of a rectangle is x cm. The other side is 5 cm shorter.

Compose and simplify an expression for the perimeter, P of the rectangle and find the value when x = 20cm

4x-10

 and when x = 20cm the perimeter is

70cm

200

Solve the inequality:

 -2x+2*(3-x) <= 9 

Give your answer in interval notation

x>= -3/4

[-3/4, oo)


300

(3/2)^-1 - (1/4)^-2 + (1/2)^0

-43/3

300

Factor:

1/x^2 -9

(1/x +3)(1/x-3)

300

Find the value of (x^2-1)/(x+1)

 when x=1/a 

Simplify.

(1-a)/a

300

Bob earns x dollars per hour, Ann earns twice as much.

Compose an algebraic expression (in terms of x) showing how much more Ann will earn than Bob, if she will work 3 hours and he will work 2 hours.

3(2x)-2(x)

300

Solve for x: (6x+2)/3 -x = x+ 2/3 

Any real number x is a solution.

400

 Simplify:  ((x^6*x^-2)/x^7)^3 

x^-9  or 1/x^9

400

! DAILY DOUBLE !

Find the value of the expression -4x^2+x+3 when x=2a-1 , Simplify your answer.

-16a^2+18a-2

400

Simplify (x+2)/(4-x^2) 

1/(2-x)

400

Two identical boxes together contain x chocolate bars. How many chocolate bars (in terms of x) will be in five such boxes?

2.5x bars of chocolate.

400

! DAILY DOUBLE !

Solve the inequality:

2x + 2*(3-x) > 9

No Solution.

500

Simplify: (-xy^4)^-1/(2xy^2)^3 

1/(-8x^4y^10)

500

Let p(x) and q(x) be polynomials such that:

p(x)=x^2+4x-1 and q(x)=x^3+2x+1 

Find:

 ((p(x+1))/(2q(0)))


(x^2+6x+4)/2

500

Simplify:

(x^2-3x)/(x^2-6x+9)

x/(x-3)

500

In a triangle ABC, the side BC is 3 cm shorter than the side AB, and the side AC is twice as long as BC.

Compose an expression for the perimeter of triangle ABC when AB has a side length of x.

Do not simplify your answer.

x+(x-3)+(2*(x-3))

500

The area, A of a Trapezoid with bases a and b and height h is 

 A = (a+b)/2 h 

Find a formula for h in terms of a, b, and A.

h = (2A)/(a+b)