Question

A, B, C are any three points in a plane. Join them in pairs. How many lines can
you get it
(a) A, B, C are collinear?
() A, B, C are not collinear?​

Answer 1

Answer:

both

Step-by-step explanation:

becoz they may be in a straight line or may be in different line...

I hope I answer is correct...

Answer 2

Answer:

(a) single line

(b) three lines

Step-by-step explanation:

Given that ,

A , B , C are any three points in a plane.

To find the how many lines can get

(a) A,B,C are collinear .

(b) A,B,C are not collinear.

So,

(a) A,B,C are collinear

If A,B,C are collinear then total number of lines is single it is because line form by A, B and C are in straight line.

(b) A,B,C are not collinear

If A,B,C are not collinear then total number of lines formed is three, because AB make a line , BC make a line and AC make a line.

So, there are three lines.

THANKS.

#SPJ3.

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