[" The three straight lines "ax+by=c,bx+...

[" The three straight lines "ax+by=c,bx+cy=a" and "cx+ay=b" are collinear,if "],[[" (A) "b+c=a," (B) "c+a=b," (C) "a+b+c=0," (D) "a+b=c]]

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The three striaght lines ax+by=c, bx+cy=a and cx+ay=b are collinear if:

If the lines ax+by+c=0,bx+cy+a=0 and cx+ay+b=0 be concurrent,then:

Prove that the straight lines ax+by+c=0,bx+cy+a=0and cx+ay+b=0 are concurrent if a+b+c=0.When a!=b!=c .

The lines ax+by+c=0, bx+cy+a =0, cx+ay+b =0 are concurrent when-

If the straight lines ax+by+c=0, bx+cy+a=0 and cx+ay+b=0 are concurrent, then prove that a^(3)+b^(3)+c^(3)=3abc

If the lines ax+by+c=0, bx+cy+a=0 and Cx+ay+b=0 are concurrent (a+b+cne0) then

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