If `2/(1 !9!)+2/(3!7!)+1/(5!5!)=2/(a!),` then orthocentre of the triangle having sides `x-y+1=0,x+y+3=0and 2x+5y-2=0` is

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If 2/(1!9!)+2/(3!7!)+1/(5!5!)=2^m/(n!) , then orthocentre of the triangle having sides x-y+1=0,x+y+3=0 and 2x+5y-2=0 is

If (2)/(1!9!)+(2)/(3!7!)+(1)/(5!5!)=(2)/(a!), then orthocentre of the triangle having sides x-y+1=0,x+y+3=0 and 2x+5y-2=0

If 2/(1 !3!)+2/(3!7!)+1/(3!5!)=2^m/(n!), then orthocentre of the triangle having sides x-y+1=0,x+y+3=0and 2x+5y-2=0 is

If 2/(1 !3!)+2/(3!7!)+1/(3!5!)=2^m/(m!), then orthocentre of the triangle having sides x-y+1=0,x+y+3=0and 2x+5y-2=0 is

If 2/(1!9!)+2/(3!7!)+2/(5!5!)=2^m/(n!) , then orthocentre of the triangle have having sides x-y+=0,x+y+3 and 2x+5y-2=0 is

Find the orthocentre of the triangle whose sides are 7x+y-10=0, x-2y+5=0, x+y+2=0

The orthocentre of the triangle formed by the lines x-7y+6=0,2x-5y-6=0 and 7x+y-8=0 is