Mathematics, 30.10.2019 09:31, rwlockwood1

What is the difference between a line segment and a ray and the difference between a line and a line segment?

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Mathematics, 25.06.2019 12:40, kenleighbrooke67

Pls answer for my online geometry class! can you use three letters to identify a line segment or a ray? yes or no. how is the notation different when labeling a line segment and a ray? the endpoint of the ray has to be the first point listed. there is no difference you can use three points to label a line segment. when labeling a line segment, the order of the endpoints matter. true falseyouuu

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Mathematics, 20.07.2019 22:10, leonarddyer4599

Gina wrote the following paragraph to prove that the segment joining the midpoints of two sides of a triangle is parallel to the third side: given: δabc prove: the midsegment between sides line segment ab and line segment bc is parallel to side line segment ac. draw δabc on the coordinate plane with point a at the origin (0, 0). let point b have the ordered pair (x1, y1) and locate point c on the x-axis at (x2, 0). point d is the midpoint of line segment ab with coordinates at ordered pair the quantity 0 plus x sub 1, divided by 2. the quantity 0 plus y sub 1, divided by 2 by the slope formula. point e is the midpoint of line segment bc with an ordered pair of ordered pair the quantity of x sub 1 plus x sub 2 divided by 2. the quantity of 0 plus y sub 1 divided by 2 by the slope formula. the slope of line segment de is found to be 0 through the application of the slope formula: the difference of y sub 2 and y sub 1, divided by the difference of x sub 2 and x sub 1 is equal to the difference of the quantity 0 plus y sub 1, divided by 2, and the quantity 0 plus y sub 1, divided by 2, divided by the difference of the quantity x sub 1 plus x sub 2, divided by 2 and the quantity 0 plus x sub 1, divided by 2 is equal to 0 divided by the quantity x sub 2 divided by 2 is equal to 0 when the slope formula is applied to line segment ac the difference between y sub 2 and y sub 1, divided by the difference of x sub 2 and x sub 1 is equal to the difference of 0 and 0, divided by the difference of x sub 2 and 0 is equal to 0 divided by x sub 2 is equal to 0, its slope is also 0. since the slope of line segment de and line segment ac are identical, line segment de and line segment ac are parallel by the definition of parallel lines. which statement corrects the flaw in gina's proof?

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Mathematics, 27.07.2019 20:30, mjakabeast24

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Mathematics, 01.09.2019 06:30, Hayes0515

Statement reason abcd is a rectangle. given line segment ab and line segment cd are parallel definition of a parallelogram line segment ad and line segment bc are parallel definition of a parallelogram ∠cad ≅ ∠acb alternate interior angles theorem definition of a parallelogram ∠adb ≅ ∠cbd alternate interior angles theorem δade ≅ δcbe angle-side-angle (asa) postulate line segment be is congruent to line segment de cpctc line segment ae is congruent to line segment ce cpctc line segment ac bisects line segment bd definition of a bisector which statement can be used to fill in the blank space? a. line segment ab is congruent to line segment cd b.line segment be is congruent to line segment ae c. line segment be is congruent to line segment ce d. line segment bc is congruent to line segment ad

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What is the difference between a line segment and a ray and the difference between a line and a line...

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