A first-degree equation is an equation where the highest power is and there is only one variable .
Solving an Equation by Adding/Subtracting from Both Sides If the number is next to with a plus, we need to subtract it from both sides.
If the number is next to with a minus, we need to add it to both sides.
Solving an Equation by Multiplying/Dividing Both Sides We will need to multiply or divide both sides of the equations where there is a coefficient for .
Solving an Equation by Combining Like Terms Move all the s to the right side and all the numbers to the left side.
Solving an equation using the distributive property We will solve according to the distributive property
\( 4x:30=2 \)
Solve the equation
\( 20:4x=5 \)
Solve x:
\( 5(x+3)=0 \)
Solve for x:
\( 2(4-x)=8 \)
Solve for x:
\( 7(-2x+5)=77 \)
To solve the given equation , we will follow these steps:
Step 1: Recognize that implies .
Step 2: Eliminate the fraction by multiplying both sides of the equation by 30.
Step 3: Simplify the equation to solve for .
Now, let's work through each step:
Step 1: The equation is written as .
Step 2: Multiply both sides of the equation by 30 to eliminate the fraction:
This simplifies to:
Step 3: Solve for by dividing both sides by 4:
Therefore, the solution to the problem is .
Checking choices, the correct answer is:
Solve the equation
To solve the exercise, we first rewrite the entire division as a fraction:
Actually, we didn't have to do this step, but it's more convenient for the rest of the process.
To get rid of the fraction, we multiply both sides of the equation by the denominator, 4X.
20=5*4X
20=20X
Now we can reduce both sides of the equation by 20 and we will arrive at the result of:
X=1
Solve x:
We open the parentheses according to the formula:
We will move the 15 to the right section and keep the corresponding sign:
Divide both sections by 5
Solve for x:
To solve this equation, follow these steps:
Step 1: Apply the distributive property to the equation:
Step 2: Simplify the equation:
The equation now becomes:
Step 3: Isolate the variable by simplifying the equation:
First, subtract 8 from both sides:
This simplifies to:
Step 4: Solve for by dividing both sides by -2:
Therefore, the solution to the equation is .
0
Solve for x:
To open parentheses we will use the formula:
We multiply accordingly
We will move the 35 to the right section and change the sign accordingly:
We solve the subtraction exercise on the right side and we will obtain:
We divide both sections by -14
-3
Solve for X:
\( x+3=5 \)
Solve for X:
\( 3-x=1 \)
Solve for X:
\( 5x=3 \)
Solve for X:
\( 3x=18 \)
Solve for X:
\( 6x=3 \)
Solve for X:
To solve the equation , we will follow these steps:
Therefore, the solution to the equation is .
Solve for X:
To solve the equation , we will isolate the variable .
Step 1: Subtract 3 from both sides of the equation.
Step 2: Simplify the expression.
Step 3: Multiply both sides by to solve for .
Thus, the solution to the equation is .
Solve for X:
To solve the equation , we will isolate by using division:
Step 3: Simplify both sides. The left side simplifies to (because ), and the right side is .
Hence, the solution to the equation is .
Solve for X:
We use the formula:
Note that the coefficient of X is 3.
Therefore, we will divide both sides by 3:
Then divide accordingly:
Solve for X:
To solve the equation , follow these steps:
Step 1: We aim to isolate . Divide both sides of the equation by 6 to remove the coefficient attached to :
Step 2: Simplify the fraction on the right side:
Therefore, the solution to the equation is .
Solve for X:
\( 8x=5 \)
Solve for X:
\( 7x=4 \)
Solve for X:
\( \frac{x}{4}=3 \)
\( 5x=0 \)
Solve for X:
\( 4x=\frac{1}{8} \)
Solve for X:
To solve the equation , follow these steps:
Now, let's outline these steps in detail:
We begin with the equation .
Dividing both sides by the coefficient of , which is 8, gives:
.
This simplifies directly to:
.
Therefore, the solution to the problem is .
Solve for X:
To solve the equation , we will follow these steps:
Step 1: We start with the equation .
Step 2: Our goal is to isolate . Since is multiplied by 7, we will divide both sides of the equation by 7.
Step 3: Performing division:
Therefore, the solution to the equation is .
Solve for X:
We use the formula:
We multiply the numerator by X and write the exercise as follows:
We multiply by 4 to get rid of the fraction's denominator:
Then, we remove the common factor from the left side and perform the multiplication on right side to obtain:
To solve the equation for , we will use the following steps:
Let's perform the calculation as outlined in Step 2:
Divide both sides by 5 to isolate :
Simplifying, this gives:
Therefore, the solution to the equation is .
The correct answer is option 4: .
Solve for X:
To solve the equation , we need to isolate . We do this by dividing both sides of the equation by the coefficient of , which is 4:
Thus, the solution to the equation is .