Segment ratio division
AB segment = 14 cm, divide it into two segments whose lengths are in the ratio 4:3.
Final Answer:
Tips for related online calculators
You need to know the following knowledge to solve this word math problem:
geometryarithmeticbasic operations and conceptsUnits of physical quantitiesGrade of the word problem
Related math problems and questions:
- Trapezoid 83
Trapezoid ABCD is composed of five triangles. Points E, and G divide segment AB in the ratio 2:4:3 (in this order) into three segments. Point F is the midpoint of segment AD. Triangle AEF is isosceles and right-angled. Triangles GBC and CDG are right-angl - Line segment
Cut a line segment of 15 cm into two line segments so that their lengths are in a ratio of 2:1. What length will each have? - Segments
We divide line segments 37 cm and 2.3 dm long into equal parts, the lengths of which are expressed as integers in centimeters. How many ways can we divide? - Line ratio division
Draw the line AB = 14 cm and divide it by the reduction angle in the ratio of 2:9. - General trapezoid In the general trapezoid VLAK the following hold: |VL| = 5.5 cm; |VK| = 3.5 cm; |LK| = 4.8 cm; |∢VLA| = 70°. Divide it into two triangles. Name the newly created points. Write down the lengths of the line segments. Complete the construction procedure and
- MO - triangles
On the AB and AC sides of the ABC triangle lies successive points E and F, and on segment EF lie point D. The EF and BC lines are parallel. It is true this ratio FD:DE = AE:EB = 2:1. The area of the ABC triangle is 27 hectares, and line segments EF, AD, a - Line segment
Line segment AB is 8 cm long. Divide it by a ratio of 2:3.
