If a system of three linear equations `x+4a y+a=0,x+3b y+b=0,a n dx+2c – InterviewSolution

InterviewSolution

1.	If a system of three linear equations `x+4a y+a=0,x+3b y+b=0,a n dx+2c y+c=0`isconsistent, then prove that `a ,b , c`are in H.P.
Answer» Since system of equation is consistent we have `Delta = \|{:(1,,4a,,a),(1,,3b,,b),(1,,2c,,c):}\|=0` `" or " 1(3bc -2bc ) -4a(c-b)+a(2c-3b)=0` `" or " bc-4ac+4ab+2ac -3ab=0` " or " bc-2ac+ =2ac` " or " bc+ ab=2ac` `" or "(1)/(a)+(1)/(c)=(2)/(b).` Thus a,b,c are in H.P.

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