Blog

Is it possible to have a triangle with sides 7cm 4cm and 11cm?

Is it possible to have a triangle with sides 7cm 4cm and 11cm?

The sum of any two sides of a triangle must be greater than the third side. This is because the shortest route between two points is a straight line. Here we have 4 cm + 7 cm = 11 cm, so these can’t be the sides of a triangle.

Can 7cm 8cm 11cm form a triangle?

Answer: To form a triangle, sum of two smaller sides must be greater than the largest sides. Heresum of smaller two sides is 4+3=7 cm., which is less than the largest side 8 cm. Hence, you can not form a triangle out of these three sides.

Can a triangle have sides 5 cm 7 cm and 11 cm give reason?

In a triangle, sum of any two sides is always greater than or equal to the third side. These measurements do not satisfy the basic condition of a triangle. Hence, the triangle cannot be constructed.

READ ALSO:   Is the Davy Back Fight filler?

Is it possible to have a triangle with sides 12cm 11cm 7cm?

this triangle is not possible.

Is it possible to construct a triangle when its sides are 8cm 7cm 4cm?

Yes, its possible to construct a triangle with sides 8cm, 7cm and 4cm as in a triangle, the sum of the 2 shortest sides should be more than the largest side. Sum of smaller sides = 4 + 7 cm = 11cm, which is greater than 8cm. Hence, the triangle can be constructed.

Is it possible to have a triangle with the sides 4cm 7cm 8cm?

No, it is not possible to construct a triangle with lengths of its sides as 4 cm, 3 cm and 7 cm because here we see that sum of the lengths of two sides is equal to third side i.e., 4+3 = 7. As we know that, the sum of any two sides of a triangle is greater than its third side, so given statement is not correct.

Is it possible to construct a triangle with sides 8cm 7cm and 4cm?

Is it possible to have a triangle with sides 11cm 4cm 6CM?

READ ALSO:   How can I improve the accessibility of my website?

ANSWER: No; 11. SOLUTION: The sum of the lengths of any two sides of a triangle must be greater than the length of the third side.

Can 5CM 6CM and 11cm make a triangle?

Answer: NO, it’s simply not possible to have a triangle with sides 5 cm, 6 cm and 11 cm. Because for the 3 points to form a triangle, you have to rise above the realm of a line into the realm of a plane.

Is it possible to have a triangle with sides 11cm 4cm 6cm?

Is it possible to have a triangle with 4cm 4cm and 8cm?

In a triangle, the sum of two sides is always greater than the third side. [] Now, sum of two sides must be greater than third side. => 4 + 4 = 8, °• No triangle can be constructed with sides 4 cm, 4 cm, and 8 cm.

Can a triangle have sides 5 cm 6 cm and 11 cm?

If the side is less than or equal to 1 or the side is greater than or equal to 11, you don’t get a Triangle. NO, it’s simply not possible to have a triangle with sides 5 cm, 6 cm and 11 cm. Why? Because for the 3 points to form a triangle, you have to rise above the realm of a line into the realm of a plane.

READ ALSO:   Who determined the boundaries of India and Pakistan?

How to find the sides of an equilateral triangle?

The sides of an equilateral triangle are 9.4 cm, correct to the nearest one decimal place. Work out the upper bound of the side of this triangle. The vertices of triangle ABC are from the line p distances 3 cm, 4 cm and 8 cm. Calculate distance from the center of gravity of the triangle to line p. Draw angle |∠ ABC| = 130° and built its axis.

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 “.

How do you calculate the properties of a triangle?

From the known height and angle, the adjacent side, etc., can be calculated. They use knowledge, e.g., formulas (relations) Pythagorean theorem, Sine theorem, Cosine theorem, Heron’s formula, solving equations and systems of equations. The second stage is the calculation of the properties of the triangle from the known lengths of its three sides.