Can the sides of a triangle have lengths 3 3 and 7?
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Can the sides of a triangle have lengths 3 3 and 7?
The length of the third side of a triangle must always be between (but not equal to) the sum and the difference of the other two sides. Therefore, the third side length must be greater than 4 and less than 8. Because 7 is greater than 4 and less than 8, it is possible for these to be the side lengths of a triangle.
How do you find the possible lengths of the third side of a triangle?
Any one side of a triangle must be shorter than the sum of the other two sides. Therefore, the third side length x must be between 5 and 35, not including those endpoints: 5 < x < 35. All whole numbers satisfying this range would form a triangle.
Can a triangle have 7/8 15 lengths?
In the usual sense of things (Euclidean Geometry), no. You could have a ‘degenerate triangle’, but that’s not exactly a triangle in the way we usually think about a triangle. 8 + 7 = 15.
What are the sides of a triangle with side lengths?
Ans: According to the triangle inequality theorem, the lengths of any two sides of a triangle must add up to greater than the length of the third side. This indicates that a triangle with side lengths of 2, 7, and 12 cannot be drawn since 2 + 7 is less than 12.(3, 4, 5), (5, 6, 7), etc., can be the sides. Q.5.
What are the types of triangles?
Triangles are classified into three kinds based on their sides: If all three sides of a triangle are of equal length, then the triangle is called an equilateral triangle. If two sides of a triangle are of equal length, then the triangle is called an isosceles triangle.
How do you know if a triangle can be constructed?
A triangle can be drawn only if the sum of any two sides of the triangle is greater than the third side. This is stated as the triangle inequality. This article will discuss the comparison of the sum of the lengths of two sides of a triangle with the third side to check whether the triangle can be constructed or not.
How do you make a triangle with 3 sides?
You can’t make a triangle! Otherwise, you cannot create a triangle from the 3 sides. Use the triangle inequality theorem and examine all 3 combinations of the sides. As soon as the sum of any 2 sides is less than the third side then the triangle’s sides do not satisfy the theorem.