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Question: Find the values of a and b for which the following system of equations has infinitely many solutions...

Find the values of a and b for which the following system of equations has infinitely many solutions.
(2a1)x3y=5 3x+(b2)y=3  \left( {2a - 1} \right)x - 3y = 5 \\\ 3x + \left( {b - 2} \right)y = 3 \\\

Explanation

Solution

Hint- Here, we will proceed by comparing the given pair of linear equations with any general pair of linear equations i.e., a1x+b1y+c1=0{a_1}x + {b_1}y + {c_1} = 0 and a2x+b2y+c2=0{a_2}x + {b_2}y + {c_2} = 0. Then using the condition for having infinitely many solutions i.e., a1a2=b1b2=c1c2\dfrac{{{a_1}}}{{{a_2}}} = \dfrac{{{b_1}}}{{{b_2}}} = \dfrac{{{c_1}}}{{{c_2}}}.

Complete step-by-step solution -
The given system of linear equations is
\left( {2a - 1} \right)x - 3y = 5 \\\ \Rightarrow \left( {2a - 1} \right)x - 3y - 5 = 0{\text{ }} \to {\text{(1)}} \\\
andand
3x+(b2)y=3 3x+(b2)y3=0 (2) 3x + \left( {b - 2} \right)y = 3 \\\ \Rightarrow 3x + \left( {b - 2} \right)y - 3 = 0{\text{ }} \to {\text{(2)}} \\\
As we know that for any pair of linear equations a1x+b1y+c1=0 (3){a_1}x + {b_1}y + {c_1} = 0{\text{ }} \to {\text{(3)}} and a2x+b2y+c2=0 (4){a_2}x + {b_2}y + {c_2} = 0{\text{ }} \to {\text{(4)}} to have infinitely many solutions, the condition which must be satisfied is that the ratio of the coefficients of x should be equal to the ratio of the coefficients of y which further should be equal to the ratio of the constant terms in the pair of linear equations.
The condition is a1a2=b1b2=c1c2 (5)\dfrac{{{a_1}}}{{{a_2}}} = \dfrac{{{b_1}}}{{{b_2}}} = \dfrac{{{c_1}}}{{{c_2}}}{\text{ }} \to (5{\text{)}}
By comparing equations (1) and (3), we get
a1=2a1,b1=3,c1=5{a_1} = 2a - 1,{b_1} = 3,{c_1} = - 5
By comparing equations (2) and (4), we get
a2=3,b2=b2,c2=3{a_2} = 3,{b_2} = b - 2,{c_2} = - 3
For the given pair of linear equations to have infinitely many solutions, equation (5) must be satisfied
By equation (5), we can write

a1a2=b1b2=c1c2 2a13=3b2=53 2a13=3b2=53 (6)  \dfrac{{{a_1}}}{{{a_2}}} = \dfrac{{{b_1}}}{{{b_2}}} = \dfrac{{{c_1}}}{{{c_2}}} \\\ \Rightarrow \dfrac{{2a - 1}}{3} = \dfrac{3}{{b - 2}} = \dfrac{{ - 5}}{{ - 3}} \\\ \Rightarrow \dfrac{{2a - 1}}{3} = \dfrac{3}{{b - 2}} = \dfrac{5}{3}{\text{ }} \to {\text{(6)}} \\\

By equation (6), we can write

2a13=53 2a1=5 2a=5+1=6 a=3  \Rightarrow \dfrac{{2a - 1}}{3} = \dfrac{5}{3} \\\ \Rightarrow 2a - 1 = 5 \\\ \Rightarrow 2a = 5 + 1 = 6 \\\ \Rightarrow a = 3 \\\

By equation (6), we can write

3b2=53  5(b2)=3×3=9 5b10=9 5b=19 b=195  \Rightarrow \dfrac{3}{{b - 2}} = \dfrac{5}{3}{\text{ }} \\\ \Rightarrow 5\left( {b - 2} \right) = 3 \times 3 = 9 \\\ \Rightarrow 5b - 10 = 9 \\\ \Rightarrow 5b = 19 \\\ \Rightarrow b = \dfrac{{19}}{5} \\\

Therefore, the required values of a and b for which the given system of linear equations has infinitely many solutions are 3 and 195\dfrac{{19}}{5} respectively.

Note- Any general pair of linear equations which are given by a1x+b1y+c1=0{a_1}x + {b_1}y + {c_1} = 0 and a2x+b2y+c2=0{a_2}x + {b_2}y + {c_2} = 0 can also have unique solution (consistent solution) if the condition a1a2b1b2\dfrac{{{a_1}}}{{{a_2}}} \ne \dfrac{{{b_1}}}{{{b_2}}} is satisfied. Also, for these pair of linear equations to have no solution, the condition a1a2=b1b2c1c2\dfrac{{{a_1}}}{{{a_2}}} = \dfrac{{{b_1}}}{{{b_2}}} \ne \dfrac{{{c_1}}}{{{c_2}}} should always be satisfied.