Class 10 Exam > Class 10 Notes > Lab Manuals for Class 10 > Lab Manual: Linear Equations
Lab Manual: Linear Equations | Lab Manuals for Class 10 PDF Download
Objective
To verify the conditions for consistency of a system of linear equations in two variables by graphical representation.
Linear Equation
An equation of the form ax + by + c = 0, where a, b, c are real numbers, a ≠ 0, b ≠ 0 and x, y are variables; is called a linear equation in two variables.
Prerequisite Knowledge
- Plotting of points on a graph paper.
- Condition of consistency of lines parallel, intersecting, coincident,
Materials Required
Graph papers, fevicol, geometry box, cardboard.
Procedure
Consider the three pairs of linear equations
- 1stpair: 2x-5y+4=0, 2x+y-8 = 0
- 2nd pair: 4x + 6y = 24, 2x + 3y =6
- 3rd pair: x-2y=5, 3x-6y=15
(a) Take the 1st pair of linear equations in two variables, e.g., 2x – 5y +4=0, 2x +y-8 = 0.
(b) Obtain a table of at least three such pairs (x, y) which satisfy the given equations.
(c) Plot the points of two equations on the graph paper as shown.(d) Observe whether the lines are intersecting, parallel or coincident. Write the values in observation table. Also, check; (a1/a2); (b1/b2); (c1/c2)
(e) Take the second pair of linear equations in two variables(f) Repeat the steps 3 and 4.(g) Take the third pair of linear equations in two variables, i.e. x-2y=5, 3x-6y=15(h) Repeat steps 3 and 4
(c) Plot the points of two equations on the graph paper as shown.
(d) Observe whether the lines are intersecting, parallel or coincident. Write the values in observation table. Also, check; (a1/a2); (b1/b2); (c1/c2)
(f) Repeat the steps 3 and 4.
(g) Take the third pair of linear equations in two variables, i.e. x-2y=5, 3x-6y=15
(h) Repeat steps 3 and 4
Obtain the condition for two lines to be intersecting, parallel or coincident from the observation table by comparing the values of (a1/a2), (b1/b2) and (c1/c2)
Observation
Students will observe that
- for intersecting lines, (a1/a2)≠(b1/b2)
- for parallel lines, (a1/a2)=(b1/b2)≠(c1/c2)
- for coincident lines, (a1/a2)=(b1/b2)=(c1/c2)
Result
The conditions for consistency of a system of linear equations in two variables is verified.
Learning Outcome
Students will learn that some pairs of linear equations in two variables have a unique solution (intersecting lines), some have infinitely many solutions (coincident lines) and some have no solutions (parallel lines).
Activity Time
Perform the same activity by drawing graphs of x-y+1=0 and 3x + 2y – 12 =0. Show that there is a unique solution. Also from the graph, calculate the area bounded by these linear equations and x-axis.
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FAQs on Lab Manual: Linear Equations - Lab Manuals for Class 10
| 1. What are linear equations? |  |
Ans. Linear equations are algebraic equations that involve only linear terms. These equations can be represented in the form of ax + b = 0, where a and b are constants, and x is the variable.
| 2. How do you solve linear equations? | |
Ans. To solve a linear equation, you need to isolate the variable on one side of the equation. This can be done by performing various operations such as addition, subtraction, multiplication, and division on both sides of the equation. The ultimate goal is to find the value of the variable that satisfies the equation.
| 3. Are there different methods to solve linear equations? | |
Ans. Yes, there are different methods to solve linear equations. Some common methods include the substitution method, elimination method, and graphing method. These methods provide different approaches to solving linear equations based on the given problem.
| 4. Can linear equations have more than one solution? | |
Ans. Yes, linear equations can have more than one solution. This usually happens when the given equation represents a line and the variable can take on any value that satisfies the equation. In such cases, the equation is called an identity or a conditional equation.
| 5. What are the applications of linear equations in real life? | |
Ans. Linear equations have numerous applications in real life. They are used in various fields such as economics, engineering, physics, and finance. For example, linear equations can be used to model and solve problems related to cost and revenue analysis, motion and distance calculations, electrical circuit analysis, and many more real-world scenarios.
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