Solve for p.

To solve for \( p \) in the equation \( 22p = 330 \), you need to divide both sides of the equation by 22:

\[ p = \frac{330}{22} \]

Now perform the division:

\[ p = 15 \]

Thus, the solution is:

\[ p = 15 \]

Solve for t.

t + 178 = 700

t =

To solve for \( t \) in the equation \( t + 178 = 700 \), you need to subtract 178 from both sides:

\[ t = 700 - 178 \]

Now perform the subtraction:

\[ t = 522 \]

Thus, the solution is:

\[ t = 522 \]

Solve for q.

684 = 12q

q =

To solve for \( q \) in the equation \( 684 = 12q \), you need to divide both sides by 12:

\[ q = \frac{684}{12} \]

Now perform the division:

\[ q = 57 \]

Thus, the solution is:

\[ q = 57 \]

Solve for u.

u/–3 = 4.3

u =

To solve for \( u \) in the equation \( \frac{u}{-3} = 4.3 \), you need to multiply both sides by \(-3\):

\[ u = 4.3 \times -3 \]

Now perform the multiplication:

\[ u = -12.9 \]

Thus, the solution is:

\[ u = -12.9 \]

Solve for g.

8.73 = g + 1.73

g =

To solve for \( g \) in the equation \( 8.73 = g + 1.73 \), you need to subtract \( 1.73 \) from both sides:

\[ g = 8.73 - 1.73 \]

Now perform the subtraction:

\[ g = 7.00 \]

Thus, the solution is:

\[ g = 7.00 \]

Solve for y.

14.69 = y + 5.88

y =

To solve for \( y \) in the equation \( 14.69 = y + 5.88 \), you need to subtract \( 5.88 \) from both sides:

\[ y = 14.69 - 5.88 \]

Now perform the subtraction:

\[ y = 8.81 \]

Thus, the solution is:

\[ y = 8.81 \]