Question

if a1/a2 is not equals to b1/b2 then what kind of intersection of point can be formed, parallel or coincident

Answer 1

Hey Dude....!!!
Here ur ans....

If a1/a2 is not equal to b1/b2....
then it unique solution as confidennt intersect....i. e exactly one solution..its intersecting ....

Answer 2

Answer:

Intersecting lines .

Step-by-step explanation:

$a_{1}x+b_{1}y+c_{1}=0 \:and\:a_{2}x+b_{2}y+c_{2}=0\\form \:a \:pair \:of\:linear \:equations$

$a_{1},\:b_{1}, \:c_{1}\:and\: a_{2},\:b_{2}, \:c_{2}\\denote \:the \: coefficients \:of \:a \: given \:pair \\of \:linear \: equations \:in \:two \: variables \\their \: exists \:a \:relation \: between \: the \: coefficients\\and \:nature \:of \: system \:of \\equations$

$If \: \frac{a_{1}}{a_{2}}≠\frac{b_{1}}{b_{2}}\\then \:the \:pair \: of \:linear \:equations \:is \: consistent ,intersect \: each\: other \:at \: one \\point \: and \: has \:unique \: solution .$

Therefore.,

Pair of system of equations represent intersecting lines.

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