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A linear equation is also known as algebraic equation in which each term has an exponent of one. The graph representation of the equation shows a straight line. Standard form of linear equation is y = m x + b. Where, x is the variable and y, m, and b are the constants.
Step 1: Solve one of the equations either for x or y.
Step 2: Substitute the solution from step 1 into the other equation.
Step 3: Now solve this equation for the second variable.
Step 1: Multiply both the equations with such numbers to make the coefficients of one of the two unknowns numerically same.
Step 2: Subtract the second equation from the first equation.
Step 3: In either of the two equations, substitute the value of the unknown variable. So, by solving the equation, the value of the other unknown variable is obtained.
Suppose there are two equation,
p_{1}x +q_{1}y = r_{1} ……..(1)
p_{2}x +q_{2}y = r_{2} ……..(2)
Multiply Equation (1) with p2
Multiply Equation (2) with p1
p_{1}p_{2}x +q_{1}p_{2}y = r_{1}p_{2}
p_{1}p_{2}x +p_{1}q_{2}y = p_{1}r_{2}
Subtracting,
q_{1}p_{2}y – p_{1}q_{2}y = r_{1}p_{2} – p_{1}r_{2}
or, y (q₁ p₂ – q₂p₁) = r₂p₁ – r₁p₂
Therefore, y = \frac{r_{2}p_{1} – r_{1}p_{2} }{q_{1}p_{2} – q_{2}p_{1} }
= \frac{r_{1}p_{2} – r_{2}p_{1} }{q_{2}p_{1} – q_{1}p_{2} }
where (p₁q₂ – p₂q₁) ≠ 0
Therefore, \frac{y}{r_{1}p_{2} – r_{2}p_{1} } = \frac{1}{q_{2}p_{1} – q_{1}p_{2} } …(3)
Multiply Equation (1) with q2
Multiply Equation (2) with q1
p_{1}q_{2}x +q_{1}q_{2}y = r_{1}q_{2}
q_{1}p_{2}x +q_{1}q_{2}y = q_{1}r_{2}
Subtracting,
p_{1}q_{2}x – p_{2}q_{1}x = r_{1}q_{2} – q_{1}r_{2}
or , x(p₁q₂ – p₂q₁) = (q₁r₂ – q₂r₁)
or, x = \frac{q_{1}r_{2} – r_{1}q_{2}}{p_{1}q_{2} – p_{2}q_{1}}
Therefore, \frac{x}{q_{1}r_{2} – r_{1}q_{2}} = \frac{1}{p_{1}q_{2} – p_{2}q_{1}} … (4)
where (p₁q₂ – p₂q₁) ≠ 0
From equations (3) and (4), we get,
\frac{x}{q_{1}r_{2} – r_{1}q_{2}} =\frac{y}{r_{1}p_{2} – p_{1}r_{2}} = \frac{1}{p_{1}q_{2} – p_{2}q_{1}}
where (p₁q₂ – p₂q₁) ≠ 0
Note: Shortcut to solve this equation will be written as
\frac{x}{q_{1}r_{2} – r_{1}q_{2}} =\frac{y}{r_{1}p_{2} – r_{2}p_{1} } = \frac{1}{q_{2}p_{1} – q_{1}p_{2} }
which means,
x = \frac{q_{1}r_{2} – r_{1}q_{2}}{q_{2}p_{1} – q_{1}p_{2} }
y = \frac{r_{1}p_{2} – r_{2}p_{1}}{q_{2}p_{1} – q_{1}p_{2}}
Now,
(A) If \frac{a_{1}}{a_{2}}=\frac{b_{1}}{b_{2}}, then there will be one solution, and the graphs will have intersecting lines.
(B) If\frac{a_{1}}{a_{2}}=\frac{b_{1}}{b_{2}} = \frac{c_{1}}{c_{2}}, then there will be numerous solutions, and the graphs will have coincident lines.
(C) If \frac{a_{1}}{a_{2}}=\frac{b_{1}}{b_{2}}≠ \frac{c_{1}}{c_{2}} then there will be no solution, and the graphs will have parallel lines.
Read Also – Tips & tricks to solve Linear Equations question
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