# Can you make a triangle with these lengths?

Table of Contents

- 1 Can you make a triangle with these lengths?
- 2 Can a triangle be constructed with sides of lengths 6 cm 7 cm and 14cm?
- 3 Can 12cm 7cm 5CM make a triangle?
- 4 Can we form a triangle with length 4cm 9cm 13cm?
- 5 Can 5cm 12cm and 13cm make a triangle?
- 6 Can a triangle be made with sides 12cm 5cm and 13cm?
- 7 What are the sizes of the angles of the triangle ABC?
- 8 What are the 3 characteristics of a triangle calculator?

## Can you make a triangle with these lengths?

No; The sum of the lengths of any two sides of a triangle must be greater than the length of the third side.

## Can a triangle be constructed with sides of lengths 6 cm 7 cm and 14cm?

Hence, it is possible to draw a triangle having sides 3.4 cm, 2.1 cm and 5.3 cm. (v) Consider the numbers 6, 7 and 14. Thus, the sum of these two numbers is not greater than the third number. Hence, it is not possible to draw a triangle having sides 6 cm, 7 cm and 14 cm.

**Can you form a triangle with the three lengths given?**

Can three equal side lengths form a triangle? Yes. It’s called an equilateral triangle, and it can work because two side lengths added together are bigger than the third side.

**Can a triangle be formed with 7cm 10cm and 5cm as its sides?**

Answer: yes. the sum of length of any two side of a triangle must be greater than the length of third side. 7+10 is greater than 5.

### Can 12cm 7cm 5CM make a triangle?

Yes, we can.

### Can we form a triangle with length 4cm 9cm 13cm?

Can we form a triangle with length: 4cm,9cm,13cm? Yes, because we can create a triangle with any three sides.

**Is it possible to draw a triangle whose sides are 8cm 7cm and 14cm?**

The sum of two sides should be greater than third side to draw a triangle. Not possible.

**Is it possible to draw a triangle the lengths of whose sides are 7cm 8cm 15cm?**

Hence, it is not possible to draw a triangle whose sides are 7 cm, 8 cm and 15 cm.

## Can 5cm 12cm and 13cm make a triangle?

Yes, we can. square of largest side. If square of largest side is equal to the sum of squares of smaller two sides, the triangle is right angled. Here as 132=169 and 52+122=25+144=169 and two are equal, we can form a right angled triangle.

## Can a triangle be made with sides 12cm 5cm and 13cm?

It is clear that the triangle is a right angled triangle.

**Can a triangle have sides with lengths 6CM 5CM and 8cm?**

5CM ,6CM AND 8 CM CANNOT BE THE LENGTHS OF A TRIANGLE.

**Can a right triangle have sides that measure 5cm 12cm and 13cm?**

Now you may see that triangle is right-angled at B, as AB² + BC² = CA². And AB ⟂ BC with CA as hypotenuse and perpendicular’s foot on CA be D. Hence, ar(ABC) = ½ AB · BC = ½ CA · BD. ⇒ BD = ( AB · BC ) ÷ CA = ( 12 × 5 ) ÷ 13 = 60/13 cm.

### What are the sizes of the angles of the triangle ABC?

The sizes of the angles of the triangle ABC are α = 35° and β = 48°. Find the magnitudes of all angles of triangle A “B” C “. In triangle ABC, the magnitude of the internal angle gamma is equal to one-third of the angle alpha. The size of the angle beta is 80 degrees larger than the size of the gamma angle.

### What are the 3 characteristics of a triangle calculator?

Triangle calculator The calculator solves the triangle specified by three of its properties. Each triangle has six main characteristics: three sides a, b, c, and three angles (α, β, γ). The classic trigonometry problem is to specify three of these six characteristics and find the other three.

**How do you find the hypothenuse of a right triangle?**

A right triangle has two sides perpendicular to each other. Sides “a” and “b” are the perpendicular sides and side “c” is the hypothenuse. Enter the length of any two sides and leave the side to be calculated blank. Please check out also the Regular Triangle Calculator and the Irregular Triangle Calculator.

**How many sides does an isosceles triangle have?**

An isosceles triangle has two sides of length 7 km and 39 km. How long is a third side? The triangles ABC and A “B” C “are similar to the similarity coefficient 2. The sizes of the angles of the triangle ABC are α = 35° and β = 48°. Find the magnitudes of all angles of triangle A “B” C “.