Answer:
Finding the distance between two distinct points on a plane is the same as finding the hypotenuse of a right triangle. From this perspective, the distance formula states that the distance of two distinct points on a plane is equal to the square root of the sum of the square of the rise and run.
<em>I </em><em>can </em><em>not </em><em>Put </em><em>Out </em><em>The </em><em>Points </em><em>So </em><em>Im </em><em>sorry. </em>
Answer: 9
Step-by-step explanation:
To solve this problem, we need to use our order of operations, or PEMDAS.
Parenthesis
Exponent
Multiply
Divide
Add
Subtract
6÷2(1+2) [parenthesis]
6÷2(3) [multiply/divide from left to right]
3(3) [multiply]
9
Now, we know that the answer is 9.
If the two points of a line segment are A and B, you write it as AB with a straight line over the top. -----
AB
If the two points of a line are A and B, you write it as AB with a double sided arrow over the top. <----->
AB
If the two points of a ray are A and B, you write it as AB with a one sided arrow over the top (the side with the arrow depends on which way the ray is pointing)
Either: <----- ------>
AB OR AB
Answer:
ratio
Step-by-step explanation:
