What is the distance between (4, 3) and (9, 15) on the coordinate plane? Select two that apply.
A.√169
B.5 units
C.12 units
D.√144
E.13 units
Answers
Answer:
A option is correct answer
Step-by-step explanation:
we can get the answer by distance formula
The distance between (4,3) and (9,15) is 13 units
Given : Coordinates of two points are (4,3) and (9,15)
To find : The distance between two points.
Solution :
We can simply solve this mathematical problem by using the following mathematical process. (our goal is to calculate the distance between the given two points)
Here, we will be using the general formulas of coordinate geometry.
First point = (4,3) = (x1,y1)
Second point = (9,15) = (x2,y2)
So, distance between those two points = √[(x2 - x1)² + (y2-y1)²]
Or,
Distance between those two points = √[(9-4)²+(15-3)²
Or,
Distance between those two points = √[(5)²+(12)²]
Or,
Distance between those two points = √(25+144)
Or,
Distance between those two points = √169
Or,
Distance between those two points = 13 units
(This will be considered as the final result)
Hence, the distance between (4,3) and (9,15) is 13 units