Find the slope of the line joining the two given points (0, 0) and (√3,3)
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Answered by
35
Hi ,
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We know that ,
If A( x1 , y1 ) , B( x2 , y2 ) are two points
in the Cartesian plane , then the slope
of the line ( m ) = ( y2 - y1 )/( x2 - x1 )
****************************************
Here,
A( x1 , y 1 ) = ( 0 , 0 )
B( x2 , y2 ) = ( √3 , 3 )
Slope ( m ) = ( y2 - y1 )/( x2 - x1 )
m = ( 3 - 0 )/( √3 - 0 )
m = 3/√3
m = ( √3 × √3 )/√3
m = √3
I hope this helps you.
: )
**************************************
We know that ,
If A( x1 , y1 ) , B( x2 , y2 ) are two points
in the Cartesian plane , then the slope
of the line ( m ) = ( y2 - y1 )/( x2 - x1 )
****************************************
Here,
A( x1 , y 1 ) = ( 0 , 0 )
B( x2 , y2 ) = ( √3 , 3 )
Slope ( m ) = ( y2 - y1 )/( x2 - x1 )
m = ( 3 - 0 )/( √3 - 0 )
m = 3/√3
m = ( √3 × √3 )/√3
m = √3
I hope this helps you.
: )
Answered by
15
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