Sentences with OBTUSE-ANGLED-TRIANGLE
Check out our example sentences below to help you understand the context.Sentences
1
"An obtuse-angled triangle has one angle that is greater than 90 degrees."
2
"In an obtuse-angled triangle, the sum of all angles is 180 degrees."
3
"The longest side of an obtuse-angled triangle is opposite to the obtuse angle."
4
"An isosceles obtuse-angled triangle has two equal angles greater than 90 degrees."
5
"The area of an obtuse-angled triangle can be determined using the formula (1/2) × base × height."
6
"If all three angles of a triangle are obtuse-angled, the triangle is obtuse and not an obtuse-angled triangle."
7
"An acute-angled triangle cannot be an obtuse-angled triangle."
8
"In an obtuse-angled triangle, the length of the longest side is greater than the sum of the lengths of the other two sides."
9
"An obtuse-angled triangle is also called an oblique triangle."
10
"The Pythagorean theorem can be applied to an obtuse-angled triangle to find the length of its sides."
11
"An equilateral triangle cannot be an obtuse-angled triangle."
12
"The angles of an obtuse-angled triangle are always in the ratio 1:1:x, where x is less than 1."
13
"In an equilateral obtuse-angled triangle, all three angles are 120 degrees."
14
"The area of an obtuse-angled triangle is always positive."
15
"An obtuse-angled triangle can have two sides of equal length."
16
"The sum of the lengths of any two sides of an obtuse-angled triangle is always greater than the length of the third side."
17
"In an obtuse-angled triangle, the length of the longest side is always opposite to the obtuse angle."
18
"An obtuse-angled triangle can never have all three sides of equal length."
1
"An obtuse-angled triangle has one angle larger than 90 degrees."
2
"The sum of all angles in an obtuse-angled triangle is greater than 180 degrees."
3
"An obtuse-angled triangle can have two small acute angles."
4
"In an obtuse-angled triangle, the longest side is always opposite the obtuse angle."
5
"The area of an obtuse-angled triangle can be calculated using the formula 0.5 * base * height."
6
"The sides of an obtuse-angled triangle can have different lengths."
7
"An obtuse-angled triangle can never be a right-angled triangle."
8
"An isosceles triangle cannot be an obtuse-angled triangle."
9
"A scalene triangle can be an obtuse-angled triangle."
10
"The Pythagorean theorem can be applied to an obtuse-angled triangle to find the length of its sides."