How to find the endpoints of a line segment - Math
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The points A, B, and C reside on a line segment. B is the midpoint of AC. If line AB measures 6 units in length, what is the length of line AC?
The points A, B, and C reside on a line segment. B is the midpoint of AC. If line AB measures 6 units in length, what is the length of line AC?
If B is the midpoint of AC, then AC is twice as long as AB. We are told that AB=6.
The diagram shows six units between points A and B, with B as the midpoint of segment AC. Therefore segment BC is also six units long, so line AC is twelve units long.
If B is the midpoint of AC, then AC is twice as long as AB. We are told that AB=6.
The diagram shows six units between points A and B, with B as the midpoint of segment AC. Therefore segment BC is also six units long, so line AC is twelve units long.
Compare your answer with the correct one above
What is the length of a line with endpoints 
and 
?
What is the length of a line with endpoints
The formula for the length of a line is very similiar to the pythagorean theorem:
Plug in our given numbers to solve:
The formula for the length of a line is very similiar to the pythagorean theorem:
Plug in our given numbers to solve:
Compare your answer with the correct one above
The points A, B, and C reside on a line segment. B is the midpoint of AC. If line AB measures 6 units in length, what is the length of line AC?
The points A, B, and C reside on a line segment. B is the midpoint of AC. If line AB measures 6 units in length, what is the length of line AC?
If B is the midpoint of AC, then AC is twice as long as AB. We are told that AB=6.
The diagram shows six units between points A and B, with B as the midpoint of segment AC. Therefore segment BC is also six units long, so line AC is twelve units long.
If B is the midpoint of AC, then AC is twice as long as AB. We are told that AB=6.
The diagram shows six units between points A and B, with B as the midpoint of segment AC. Therefore segment BC is also six units long, so line AC is twelve units long.
Compare your answer with the correct one above
What is the length of a line with endpoints and ?
What is the length of a line with endpoints
The formula for the length of a line is very similiar to the pythagorean theorem:
Plug in our given numbers to solve:
The formula for the length of a line is very similiar to the pythagorean theorem:
Plug in our given numbers to solve:
Compare your answer with the correct one above
The points A, B, and C reside on a line segment. B is the midpoint of AC. If line AB measures 6 units in length, what is the length of line AC?
The points A, B, and C reside on a line segment. B is the midpoint of AC. If line AB measures 6 units in length, what is the length of line AC?
If B is the midpoint of AC, then AC is twice as long as AB. We are told that AB=6.
The diagram shows six units between points A and B, with B as the midpoint of segment AC. Therefore segment BC is also six units long, so line AC is twelve units long.
If B is the midpoint of AC, then AC is twice as long as AB. We are told that AB=6.
The diagram shows six units between points A and B, with B as the midpoint of segment AC. Therefore segment BC is also six units long, so line AC is twelve units long.
Compare your answer with the correct one above
What is the length of a line with endpoints and ?
What is the length of a line with endpoints
The formula for the length of a line is very similiar to the pythagorean theorem:
Plug in our given numbers to solve:
The formula for the length of a line is very similiar to the pythagorean theorem:
Plug in our given numbers to solve:
Compare your answer with the correct one above
The points A, B, and C reside on a line segment. B is the midpoint of AC. If line AB measures 6 units in length, what is the length of line AC?
The points A, B, and C reside on a line segment. B is the midpoint of AC. If line AB measures 6 units in length, what is the length of line AC?
If B is the midpoint of AC, then AC is twice as long as AB. We are told that AB=6.
The diagram shows six units between points A and B, with B as the midpoint of segment AC. Therefore segment BC is also six units long, so line AC is twelve units long.
If B is the midpoint of AC, then AC is twice as long as AB. We are told that AB=6.
The diagram shows six units between points A and B, with B as the midpoint of segment AC. Therefore segment BC is also six units long, so line AC is twelve units long.
Compare your answer with the correct one above
What is the length of a line with endpoints and ?
What is the length of a line with endpoints
The formula for the length of a line is very similiar to the pythagorean theorem:
Plug in our given numbers to solve:
The formula for the length of a line is very similiar to the pythagorean theorem:
Plug in our given numbers to solve:
Compare your answer with the correct one above