How do you solve the following linear system: #2x+y=-3/2, 6x+3y=5#?
2 Answers
There is no solution for the pair of equations.
Explanation:
Multiply 3 both sides
And ,
You see the LHS of both the equations are equal but the RHS of both the equations are unequal.
Thus , no solution exists for the given pair of linear equations.
Explanation:
#2x+y=-3/2to(1)#
#6x+3y=5to(2)#
#"From equation "(1)" we obtain"#
#y=-3/2-2x#
#color(blue)"Substitute "y=-3/2-2x" into equation "(2)#
#6x+3(-3/2-2x)=5#
#rArrcancel(6x)-9/2cancel(-6x)=5#
#rArr-9/2=5#
#"Obviously this is not a true statement hence no solution"#
#"Consider the equations in "color(blue)"slope-intercept form"#
#(1)toy=-3/2-2x#
#(2)toy=-2x+5/3#
#"both lines have "m=-2rArr" parallel lines"#
#"thus they never intersect and so have no solution"#
graph{(y+2x+3/2)(y+2x-5/3)=0 [-10, 10, -5, 5]}
