Question

distance between two points ,(2,4)and,(6,4) find​

Answer 1

Given :

• points are ( 2 , 4 ) and ( 6 , 4 )

To find :

• Distance :

Solution :

As we know that :

$\star \bold{d \: = \sqrt{( {x_2 - x_1)}^{2} + (y_2 - y_1) ^{2} } }$

• x1 = 2 , y1 = 4

• x2 = 6 , y2 = 4

$\implies \: d = \sqrt{ {(6 - 2)}^{2} + {(4 - 4)}^{2} } \\ \\ \implies \: d = \sqrt{ {4}^{2} + 0} \\ \\ \implies \: d = \sqrt{16} \\ \\ \implies \: d \: = 4$

Answer 2

Given ,

The two points are (2,4) and (6,4)

We know that , the distance between two points is given by

$\boxed{ \tt{Distance = \sqrt{ {( x_{2} - x_{1} )}^{2} + {(y_{2} - y_{1})}^{2} } }}$

Thus ,

$\tt Distance = \sqrt{ (6 -2)^{2} + {(4 - 4)}^{2} }$

$\tt Distance = \sqrt{ {(4)}^{2} }$

$\tt Distance =4 \: \: units$

Therefore , the distance b/w (2,4) and (6,4) is 4 units