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
Solve for x:
\( 2(4-x)=8 \)
\( x+7=14 \)
\( x=\text{?} \)
Solve for X:
\( 5x=25 \)
Solve for X:
\( x + 8 = 10 \)
Solve for X:
\( \frac{1}{3}x=9 \)
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
To solve the equation , we aim to find the value of by isolating it on one side.
Therefore, we have found that the solution to the equation is , which matches the given answer choice 2.
7
Solve for X:
To solve the equation , we will isolate using division:
After performing the division, we get:
Thus, the solution to the equation is .
5
Solve for X:
To solve for , start by isolating on one side of the equation:
Subtract 8 from both sides:
simplifies to
.
2
Solve for X:
To solve the equation , we need to isolate the variable . To accomplish this, we can multiply both sides of the equation by 3, the reciprocal of .
Step-by-step solution:
Therefore, the solution to the equation is . This matches choice number 1 from the provided options.
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Find the value of the parameter X:
\( x+5=8 \)
\( x+x=8 \)
Solve for X:
\( x + 7 = 12 \)
Solve for X:
\( 5-x=4 \)
Solve for x:
\( 7(-2x+5)=77 \)
Find the value of the parameter X:
To solve the equation , follow these steps:
Therefore, the solution to the equation is .
The correct answer choice is: 3
3
To solve the equation , follow these steps:
Therefore, the solution to the equation is .
4
Solve for X:
To solve for , start by isolating on one side of the equation:
Subtract 7 from both sides:
simplifies to
.
5
Solve for X:
To solve the equation , we aim to isolate on one side of the equation.
We start by considering the equation:
Step 1: Eliminate 5 from the left side to isolate terms involving . To do this, subtract 5 from both sides of the equation:
Step 2: Simplify both sides:
Step 3: To solve for , multiply or divide both sides by to change the sign of :
This simplifies to:
Therefore, the solution to the equation is .
The correct answer is .
1
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
\( 7m+3m-40m=0 \)
\( m=\text{?} \)
Solve for X:
\( x + 3 = 7 \)
Solve for X:
\( 3+x=4 \)
Solve for X:
\( x + 9 = 15 \)
Solve for X:
\( 6x=72 \)
To solve this problem, we'll proceed with the following steps:
Now, let's work through these steps:
Step 1: Combine like terms:
We start with the equation .
Combining these like terms entails adding or subtracting the coefficients of :
Calculate the sum and difference of these coefficients:
This simplifies to:
Step 2: Solve for :
To isolate , divide both sides by :
Calculate the right-hand side:
Therefore, the solution to the problem is . This corresponds to choice 3 from the provided answer options.
0
Solve for X:
To solve for , start by isolating on one side of the equation:
Subtract 3 from both sides:
simplifies to
.
4
Solve for X:
To solve this problem, we will follow these steps:
Now, let's work through these steps:
Step 1: We have the equation: .
Step 2: Subtract 3 from both sides of the equation to isolate :
This simplifies to:
Therefore, the solution to the equation is .
1
Solve for X:
Step-by-step solution:
1. Begin with the equation:
2. Subtract 9 from both sides: , which simplifies to
6
Solve for X:
To solve for in the equation , follow these steps:
Step 1: Identify the equation and the coefficient of .
The given equation is , where the coefficient of is 6.
Step 2: Isolate by dividing both sides of the equation by the coefficient (6).
Perform the division: .
Step 3: Simplify the result.
Calculating , we get .
Therefore, the solution to the equation is .
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