The ratio of the length of the side in the big triangle to the length of the corresponding side in the little triangle is the scale factor.
The scale factor of triangle ABC to triangle XYZ can be determined by comparing the lengths of corresponding sides of the two triangles. To find the scale factor, divide the length of a side in triangle ABC by the length of the corresponding side in triangle XYZ. If all corresponding sides have the same ratio, that ratio is the scale factor for the triangles.
You cannot. There is no scale factor between an irregular pentagon and an equilateral triangle, for example.
To determine the base of the original triangle when a scale factor is used for reduction, you need to know the length of the base of the reduced triangle and the scale factor. If the scale factor is given as a fraction (e.g., 1/2), you can find the original base by dividing the base length of the reduced triangle by the scale factor. For example, if the reduced base is 5 units and the scale factor is 1/2, the original base would be 5 / (1/2) = 10 units.
To determine the scale factor of triangle ABC to triangle DEF, you need to compare the lengths of corresponding sides of the two triangles. The scale factor can be calculated by dividing the length of a side in triangle ABC by the length of the corresponding side in triangle DEF. If you have specific side lengths, you can calculate the scale factor directly using those values. For example, if side AB is 6 units and side DE is 3 units, the scale factor would be 6/3 = 2.
You find the scale factor on a triangle by dividing the short side by the long side.
The ratio of the length of the side in the big triangle to the length of the corresponding side in the little triangle is the scale factor.
The scale factor of triangle ABC to triangle XYZ can be determined by comparing the lengths of corresponding sides of the two triangles. To find the scale factor, divide the length of a side in triangle ABC by the length of the corresponding side in triangle XYZ. If all corresponding sides have the same ratio, that ratio is the scale factor for the triangles.
To find the scale factor of two triangles, look first for one pair of corresponding sides--one side from the smaller triangle and the corresponding side from the larger triangle. Divide the larger side length by the smaller side length, and that quotient is your scale factor.
The way you use a scale factor to enlarge a triangle is to multiply each side of the triangle by that scale factor. Your triangle will then be that many times larger.
You cannot. There is no scale factor between an irregular pentagon and an equilateral triangle, for example.
Find the coordinates of the vertices of triangle a'b'c' after triangle ABC is dilated using the given scale factor then graph triangle ABC and its dilation A (1,1) B(1,3) C(3,1) scale factor 3
To determine the base of the original triangle when a scale factor is used for reduction, you need to know the length of the base of the reduced triangle and the scale factor. If the scale factor is given as a fraction (e.g., 1/2), you can find the original base by dividing the base length of the reduced triangle by the scale factor. For example, if the reduced base is 5 units and the scale factor is 1/2, the original base would be 5 / (1/2) = 10 units.
To determine the scale factor of triangle ABC to triangle DEF, you need to compare the lengths of corresponding sides of the two triangles. The scale factor can be calculated by dividing the length of a side in triangle ABC by the length of the corresponding side in triangle DEF. If you have specific side lengths, you can calculate the scale factor directly using those values. For example, if side AB is 6 units and side DE is 3 units, the scale factor would be 6/3 = 2.
Look for corresponding parts of the two figures. Their ratio is the scale factor. For example, if you have two similar triangles, one has a side of length 3, and the corresponding side on the other triangle is 5, then the scale factor is 5/3 going from the small triangle to the big, or 3/5 going from the big triangle to the small.
The scale factor of the dilation that transforms triangle PQR to triangle P'Q'R' can be determined by comparing the lengths of corresponding sides of the triangles. If, for example, the length of side PQ is 4 units and the length of side P'Q' is 8 units, the scale factor would be 8/4 = 2. This means that triangle P'Q' is twice the size of triangle PQR, indicating a dilation with a scale factor of 2.
No, there cannot be a zero in any scale factor.