Chapter 1 - Review

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Company A - $50 initial set-up fee and $1.50 per brochure Company B - $75 initial set-up fee and $1.00 per brochure Write an equation for each company and find out how many brochures you would need to print for the cost from each company to be equal

50 brochures

Rule or Theorem

A proven conjecture or statement

Solution

A value that makes the equation true

Extraneous Solution

An apparent solution that must be rejected because it does not satisfy the original equation

Linear Equation in One Variable

An equation that can be written in the form ax + b = 0, where a and b are constants and a does NOT equal 0

Absolute Value Equation

An equation that contains an absolute value expression

Literal Equation

An equation that has two or more variables

Identity

An equation that is true for all values of the variable

Equivalent Equations

Equations that have the same solution(s)

Solve 5(1 + x) = 5x + 5

Identity - Infinitely Many Solutions

Solve 5(2c + 7) - 3c = 7(c + 5)

Infinite Solutions

13 + 3p + 10 = 23 + 3p

Infinite Solutions (Identity)

The minimum sustained wind speed of a Category 1 hurricane is 74 miles per hour. The maximum sustained wind speed is 95 miles per hour. Write an absolute value equation that represents the minimum and maximum speeds. Use "v" for the unknown.

Iv - 84.5I = 10.5

Formula

Shows how one variable is related to one or more variables. This is a type of Literal Equation

Equation

Statement that two expressions are equal

Mean

The average of the numbers: a calculated "central" value of a set of numbers

Inverse Operations

Two operations that undo each other, such as addition and subtraction

Conjecture

Unproven statement about a general mathematical concept

Solve x + 2 = 5

X = 3

Quadrilateral - Sum of ALL angles = 360 Angle 1 - 5b Angle 2 - 4b Angle 3 - 5b Angle 4 - 4b Solve for b

b = 20

Solve Ib - 12I = 15

b = 27; b = -3

Solve |2b - 9| = |b - 6|

b = 3; b = 5

Solve g + 5 = 17

g = 12

y = mx + b - Solve for m

m = (y-b)/x

If m = pV and p = 5.01g/cm^3 and V = 1.2cm^3 - What is the mass (m)

m = 6.012g

p = m/V - solve for m

m = Vp

Solve 3n - 3 = 4n +1

n = -4

Solve 5n = -20

n = -4

Solve n + 5n + 7 = 43

n = 6

Solve I2r + 5I = 3r

r = 5; r = -1 is an extraneous solution

Solve 2.6 = -0.2t

t = -13; Divide each side by -0.2

Solve Ix - 2I = I4 + xI

x = -1

Solve x - 5 = -9

x = -4

Triangle - Sum of ALL Angles = 180 Angle 1 = 5x Angle 2 = 90 Angle 3 = x Solve for x

x = 15

Solve -6x + 23 + 2x = 15

x = 2

Solve 4x + 8 + 6x - 5 = 33

x = 3

Solve 4x = 12

x = 3

Solve I2x + 6I = 4x

x = 3, x = -1 is extraneous

Solve Ix - 5I = 3

x = 8 and x = 2

Solve 2(y - 4) = -4(y + 8)

y = -4

Solve 3y + 11 = -16

y = -9

2x - 4y = 20 - Solve for y

y = 1/2x - 5

Solve Iy + 3I = 17

y = 14, y = -20

Solve for y 5x + y = 2

y = 2 - 5x

8x - 3 = 5 + 4y - Solve for y

y = 2x - 2

Solve for y 2x + 5y = 3y + 8

y = 4 - x

Solve 7 + 4y = 39

y = 8

Solve z + 3 = -6

z = -9; Subtract 3 from each side

Solve z/4 = 12

z = 48

For a school play, the maximum age for a youth ticket is 18 years old. The minimum age is 10 years old. Write an absolute value equation for which the two solutions are the minimum and maximum ages for a youth ticket.

|x - 14| = 4


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