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What else can I help you with?
How do you classify a triangle with 3 given side lengths?
That depends on what the side lengths are. Until the side lengths are known, the triangle can only be classified as a triangle.
Given two sides with lengths 34 and 14 which of the following lengths would NOT work for the third side of a triangle?
There are not any following lengths in the question to compare. Using the sizes given, and Pythagorean Theorem, the Hypotenuse of the triangle is 36.76 - which will have to do!
How many triangles exist with the given side lengths 3cm 4cm 2cm?
A scalene triangle is one type of triangle that will be formed from the given dimensions.
How do you find the side length on a triangle with one angle given?
To find side lengths on a triangle, you need to know at least one of the sides. The possible combinations for solving* a triangle are: side, side, side; side, angle, side; angle, side, angle; angle, side, longer side. *To solve a triangle is to find the lengths of all the sides and the measures of all the angles.
Is there a triangle that has one side of length 4 inches one side of 2 inches and one side of length 1 inch?
No because in order to construct a triangle the sum of its 2 shortest sides must be greater than its longest side and from the given dimensions 2+1 is less than 4 and so therefore a triangle is not possible.
Can the side lengths of 541 make a triangle?
If you mean side lengths of 5, 4 and 1 then it is not possible to construct any triangle from the given dimensions.
Is it possible to construct a triangle with the given side lengths 30 32 34?
Yes, it's entirely possible, and quite easy as well.
Why can you make a triangle and how many triangles can you make with the given side legnths 3 4 and 5?
Because the sum of the smaller sides is greater than the largest side and it is possible to construct one right angle triangle with the given lengths
Is it possible to construct a triangle acruatly given ssa?
No, it is an ambiguous case: there are two possible configurations.
What is history of theodolite?
From geometry, we know that it is possible to calculate unknown lengths and angles of a triangle given particular information regarding the other angles and lengths of the sides of a triangle. For example, given beginning coordinates such as (x,y) in plane coordinates or the latitude and longitude, it is then possible to calculate new coordinates by measuring certain angles and distances (lengths of sides of a triangle).
How do you classify a triangle with 3 given side lengths?
That depends on what the side lengths are. Until the side lengths are known, the triangle can only be classified as a triangle.
What is the area of a figure with lengths of 2 7 and 10?
It is not possible to answer the question without information about the shape. The fact that there are three numbers given might suggest that it is a triangle. However the three lengths are not consistent with a triangle.
Can 5 8 12 construct a triangle?
The given dimensions will construct a triangle which will almost look like a straight line.
Is it possible to draw a triangle with 150 20 and 20?
No, it is not possible to draw a triangle with side lengths of 150, 20, and 20. In a triangle, the sum of the lengths of any two sides must be greater than the length of the third side according to the Triangle Inequality Theorem. In this case, 20 + 20 is less than 150, so the given side lengths do not satisfy this theorem, making it impossible to form a triangle.
Could 4 7 7 be side lengths of a triangle?
Yes and the given lengths would form an isosceles triangle.
Triangle side is 45 the other is 45 what is the third angle?
It is not possible to determine the measure of an angle if the lengths of two sides are given.
How can you tell if it is possible to draw a quadrilateral given four side length?
To determine if it is possible to draw a quadrilateral given four side lengths, you can use the triangle inequality theorem. The theorem states that the sum of the lengths of any two sides of a triangle must be greater than the length of the third side. If this condition is met for all combinations of three sides using the given side lengths, then it is possible to construct a quadrilateral. If the sum of the lengths of any two sides is equal to or less than the length of the third side for any combination, then it is not possible to draw a quadrilateral with those side lengths.
