1 thought on “find the number of triangles that can be drawn having its angle as 53 degree 64 degree and 63 degree”
Answer:
Infinitely many triangles can be drawn having its angles as 53°, 64° and 63°. Justification: According to angle sum property, We know that the sum of all the interior angles of a triangle should be = 180°. According to the question, We have the angles 53°, 64°, and 63°. Sum of these angles = 53° + 64° + 63° = 180° Hence, the angles satisfy the angle sum property of a triangle. Therefore, infinitely many triangles can be drawn having its angles as 53°, 64° and 63Read more on Sarthaks.com – https://www.sarthaks.com/869576/how-many-triangles-can-be-drawn-having-its-angles-53-64-and-63-give-reason-for-your-answer
Answer:
Infinitely many triangles can be drawn having its angles as 53°, 64° and 63°. Justification: According to angle sum property, We know that the sum of all the interior angles of a triangle should be = 180°. According to the question, We have the angles 53°, 64°, and 63°. Sum of these angles = 53° + 64° + 63° = 180° Hence, the angles satisfy the angle sum property of a triangle. Therefore, infinitely many triangles can be drawn having its angles as 53°, 64° and 63Read more on Sarthaks.com – https://www.sarthaks.com/869576/how-many-triangles-can-be-drawn-having-its-angles-53-64-and-63-give-reason-for-your-answer