given only a compass and straightedge, Greeks were able to construct any geometric object they wished true or flase

The ancient Greek mathematicians believed that any construction could be done by straightedge and a compass but when they actually tried to construct they observed that some polygons were constructed but most of them were not.

Later on , In algebra it was observed that:

A length is constructible if and only if it is a constructible number.

An angle could be constructible if it's cosine is a constructible number.

A number is constructible if it contain four basic arithmetic operation.

gmany gmany · Answer 2 · 2019-07-28T22:12:15+02:00

gmany gmany

28-07-2019

Answer:

FALSE

Step-by-step explanation:

Examples:

regular heptagon

regular nexus

angle of measure 1°

Having only a compass and straightforwardness can not be constructed.

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given only a compass and straightedge, Greeks were able to construct any geometric object they wished true or flase ​

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Answer:

Step-by-step explanation:

FALSE

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given only a compass and straightedge, Greeks were able to construct any geometric object they wished true or flase