How many triangles can be constructed with angles measuring 90 degree, 60 degree, and 60 degree?
A) One
B) More than one
C) None

The correct option is: Option (C) None

Explanation:
All triangles must satisfy the following condition:

"The sum of all the angles of a triangle should be 180°."

90° + 60° + 60° = 210°

210° > 180°; therefore, the condition of a triangle is NOT satisfied.

Hence the correct option is "(C) None." (as the condition of a triangle is not satisfied)

Answer Link

AlonsoDehner AlonsoDehner · Answer 2 · 2019-04-26T17:43:44+02:00

Answer:

Option C ) None

Step-by-step explanation:

In Euclidean geometry we have sum of 3 angles of any triangle would be 180 degrees or 2 right angles.

Here given that angles of a triangle are 90,60 and 60

When we add up we get

90+60+60 =210>180

Since sum of angles is not equal to 180, the figure formed is not at all a triangle,

Hence no triangle can be drawn with angles measuring 90 degree, 60 degree, and 60 degree

Correct option is

Option C) NOne

How many triangles can be constructed with angles measuring 90 degree, 60 degree, and 60 degree? A) OneB) More than one C) None

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How many triangles can be constructed with angles measuring 90 degree, 60 degree, and 60 degree?
A) One
B) More than one
C) None