a1/a2=b1/b2=c1/c2, this pair of linear equation will be having how many solutions?, Two solutions, One solution, No solution, infinitly many solutions, 6x-3y=8=0 and 2x-y=9=0 will be having which type of lines?, intersecting lines, parallel lines, coincident lines, none of the above, 2x+3y-9=0 and 4x+6y-18=0 will be having which type of lines?, coincidence lines , intersecting lines , parallel lines, none of the above , solve equation x+y=14 , x-y=4 and find x and y by substitution method, x=5 , y=9, x=16 , y=13, x=9 , y=5, x=13 , y=19, By using the elimination method find the solutions of the following pair linear equation :- 2x+3y=8 , 4x+6y=7, one solution, no solution , two solution, none of the above , if a1/a2 is not equal to b1/b2 the pair of linear equation will be having ,, no solution , infinitely many solution, unique solution, none of the above, The pair of equations x=0 and x=5 has:-, coincident, intersecting at two points, parallel, no solutions, if a pair of linear equations is consistent, then the lines will be,, parallel, always coincident, intersecting or coincident, always intersecting, the pair of equations 3x-5y=7 and -6x+10y=7 have,, no solution, two solution, a unique solution, infinitely many solution, Graphically , the pair of equations 7x-y=5 , 21x-3y=10 represents two lines which are, coincident, intersecting at one point, intersecting at two point, parallel, For what value of k,do the equations 2x-3y+10=0 and 3x+ky+15=0 represent coincident lines, -9/2, 9/2, -11, -7, The pair of equation x=-4 and y=-5 graphically represents lines which are,, intersecting at (4,5), intersecting at (5,4), intersecting at (-5,-4), intersecting at (-4,-5).

Linear equation in two variable

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