Solving First-Degree Equations Practice Problems - All Methods

We use the formula:

$a\cdot x=b$

$x=\frac{b}{a}$

Note that the coefficient of X is 3.

Therefore, we will divide both sides by 3:

$\frac{3x}{3}=\frac{18}{3}$

Then divide accordingly:

$x=6$

To solve the equation $x + 7 = 14$, we aim to find the value of $x$ by isolating it on one side.

• Step 1: Identify the current equation: $x + 7 = 14$.
• Step 2: To isolate $x$, perform the inverse operation. Subtract 7 from both sides to maintain equality.
• Step 3: Simplify both sides: $x + 7 - 7 = 14 - 7$.
• Step 4: This simplifies to $x = 7$.

Therefore, we have found that the solution to the equation $x + 7 = 14$ is $x = 7$, which matches the given answer choice 2.

To solve the equation $x - 7 = 14$, we need to isolate $x$.

Step 1: Add 7 to both sides of the equation to cancel out the -7 on the left side.
$x - 7 + 7 = 14 + 7$
Step 2: Simplify both sides.
$x = 21$
Thus, the solution is $x = 21$.

To solve the equation $x + 9 = 3$, we need to isolate $x$.

Step 1: Subtract 9 from both sides of the equation to cancel out the +9 on the left side.
$x + 9 - 9 = 3 - 9$
Step 2: Simplify both sides.
$x = -6$
Thus, the solution is $x = -6$.

To solve the equation $x - 5 = -10$, we need to isolate $x$.

Step 1: Add 5 to both sides of the equation to cancel out the -5 on the left side.
$x - 5 + 5 = -10 + 5$
Step 2: Simplify both sides.
$x = -5$
Thus, the solution is $x = -5$.