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BlueSky06
The five essential hypothesizes of Geometry, additionally alluded to as Euclid's proposes are the accompanying: 
1.) A straight line section can be drawn joining any two focuses. 
2.) Any straight line portion can be expanded uncertainly in a straight line. 
3.) Given any straight line fragment, a circle can be drawn having the portion as a span and one endpoint as the inside. 
4.) All correct points are harmonious. 
5.) If two lines are drawn which meet a third such that the total of the internal points on one side is under two right edges (or 180 degrees), then the two lines unavoidably should converge each other on that side if reached out sufficiently far.
midnighttea1017

Answer:

A. A straight line segment can be drawn between any two points.

B. All right angles are equal.

C. All right triangles are equal.

D. Any straight line segment can be extended indefinitely.

Step-by-step explanation:

These are the options on A P E X and they are all correct! (:

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