Is d = -3 a solution to the following equation? 

4(d + 7) = 16

The solution when you solve the equation

3(-2x + 5) = 11 - 4x.

-15x = -5(3x + 7)

Identify the graph that matches the inequality

-7x + 13 = -8

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

-(7n - 7)= 56

1/4x + 3 = 4 + 1/3x

-9m + 16 = -5m - 4(m - 4)

Which inequality is graphed on the number-line below?   

a.)  2x + 12 < 18         b.)  -2x + 5 > 11   

c.)  -3x – 2 < -11          d.) 4x – 6 > -18

-7k - (10 - k) = -58

If you pay a one-time fee of $30, you can purchase gold tickets for your local minor league baseball team for only $3 a game. Regular tickets sell at the satadium for $6. How many gold tickets would you need to buy to equal the cost of the tickets.

Solve the equation and identify if their is one solution, no solution, or infinitely many solutions.

4(g + 8) = 7 + 4g

For a scientific experiment, a physicist must make sure that the temperature of a metal gets no colder (less) than -80°C. The physicist changes the metal’s temperature at a steady rate of -4°C per hour. How long can the physicist change the temperature? White and solve an inequality for this situation.