find the distance of the point (-6 ,8 ) from the x axis
Answers
Answer:
Answer. Point (6 , 8) has its coordinates on x-axis at 6 and y-axis at 8. Thus, its distance from y-axis will be the perpendicular distance from the point to y-axis which will be of 6 units.
Answer:
Hence, the shortest distance Between P(-6,8) and x axis is 8 unit
Step-by-step explanation:
To find the distance between any point and an axis, we simply find the sum of the squares of the other two coordinates and then square root the answer. As we want to calculate the distance to the -axis, we square the - and -coordinates, find their sum, and then square root our answer.
Let us mark the point P (-6,8) in the Cartesian plane.
The shortest distance between the coordinate (-6,8) and the x – axis is a straight line to the point (-6,0).
We are said to find the shortest distance from (x - axis). So the point is (-6,0).
To find the distance, we can use the distance formula.
To find the distance, we can use the distance formula.Distance formula =√(x2−x1)²+(y2−y1)²
Here,
X1,y1 = (-6,0)
X2,y2 =(-6,8)
Now ,
√{-6 -(-6)}² + {8-0}
√(0) +(8)²
√64
=8
Hence, the shortest distance Between p and x axis is 8unit.
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