Mada za sehemu hiiAlgebraMada 2
- Equations of two unknowns
- Inequalities
Steps for solving linear simultaneous equations by elimination method:
Arrange both equations in standard form:
- Choose a variable to eliminate.
- Multiply one or both equations to make the coefficients of the chosen variable equal.
- Add or subtract the equations to eliminate that variable.
- Solve the resulting equation for the remaining variable.
- Substitute the found value into one of the original equations to find the second variable.
Linear simultaneous equations, also known as a system of linear equations, are two or more algebraic equations that share the same variables and are solved together. They are called simultaneous because the solution satisfies all equations in the system at the same time.
General Form:
Example of one linear equation:
To solve a system of equations like this, we need at least two equations involving the same variables. For example:
This system can be solved using methods such as:
- Elimination Method
- Substitution Method
- Graphical Method
The solution to a linear simultaneous equation is the pair that satisfies both equations at once.
Solve the following simultaneous equations by elimination method.
Solution
Step 1: Subtract equation (2) from equation (1) to eliminate
Step 2: Solve for
Step 3: Substitute into equation (2) to find
Final Answer:
Solve the following simultaneous equations by elimination method.
Solution
Step 1: Eliminate . To do this, multiply both equations to make the coefficients of equal. Multiply equation (1) by 2:
Equation (2) is:
Step 2: Add equations (3) and (2) to eliminate :
Step 3: Solve for
Step 4: Substitute into equation (1) to find
Final Answer:
Solve the following linear simultaneous equations by elimination method.
Solution
Step 1: Eliminate one variable. Let's eliminate by making the coefficients of equal. Multiply equation (1) by 2:
Multiply equation (2) by 3:
Step 2: Subtract equation (3) from equation (4) to eliminate :
Step 3: Solve for
Step 4: Substitute into equation (1) to solve for
Final Answer:
Find the solution of the following simultaneous equations by elimination method.
Solution
Step 1: Let and , so the equations become:
Step 2: Eliminate one variable. Multiply equation (4) by 2 so that we can eliminate :
Now subtract equation (3) from equation (5):
Step 3: Substitute into equation (4) to find :
Step 4: Recall , , so:
Final Answer:
Definition: The substitution method involves selecting one equation and expressing one variable in terms of the other. This expression is then substituted into the second equation to eliminate one variable, allowing us to solve for the other.
Steps:
- Choose one of the two equations.
- Make one variable the subject of the equation.
- Substitute this expression into the second equation.
- Solve the resulting equation (with one variable).
- Substitute the found value back into one of the original equations to find the other variable.
- Write the final solution as an ordered pair .
Example 1
Substitute into second equation:
Final Answer:
Example 2
Substitute into second equation:
Final Answer:
Example 3
Substitute into second equation:
Final Answer:
Example 4
Substitute:
Final Answer:
Example 5
Substitute:
Final Answer:
Example 6
Substitute:
Final Answer:
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