1 / 15

Geometric Solids

Geometric Solids. Similar Solids. Definition: Two solids of the same type with equal ratios of corresponding linear measures (such as heights or radii) are called similar solids. . Similar solids. Similar Solids. Similar solids. NOT similar solids. 4. 6. 2. 8. 3. 12.

mali
Download Presentation

Geometric Solids

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript

  1. Geometric Solids Similar Solids

  2. Definition: Two solids of the same type with equal ratios of corresponding linear measures (such as heights or radii) are called similar solids. Similar solids

  3. Similar Solids Similar solids NOT similar solids

  4. 4 6 2 8 3 12 Similar Solids & Corresponding Linear Measures To compare the ratios of corresponding side or other linear lengths, write the ratios as fractions in simplest terms. Length: 12 = 3 width: 3 height: 6 = 3 8 2 2 4 2 ** Notice that all ratios for corresponding measures are equal in similar solids. The reduced ratio is called the “scale factor”.

  5. 9 12 6 12 8 16 Example: Are these solids similar? Solution: All of the corresponding lengths have the same scale factor, therefore the figures are similar.

  6. 18 6 4 8 Example: Are these solids similar? Solution: Corresponding ratios are not equal, so the figures are not similar.

  7. Similar Solids and Ratios of Areas • If two similar solids have a scale factor of a : b, then corresponding areas have a ratio of a2: b2. • This applies to: • Lateral Area • Surface Area • Base Area

  8. 3.5 7 4 2 5 Similar Solids and Ratios of Areas Ratio of sides = 2: 1 8 4 10 Surface Area = base + lateral = 10 + 27 = 37 Surface Area = base + lateral = 40 + 108 = 148 Ratio of surface areas = 148:37 = 4:1 = 22: 12

  9. Similar Solids and Ratios of Volumes • If two similar solids have a scale factor of a : b, then their volumes have a ratio of a3 : b3.

  10. 9 6 15 10 Similar Solids and Ratios of Volumes Ratio of heights = 3:2 V = r2 h = (92) (15) = 1215 V= r2 h = (62)(10) = 360 Ratio of volumes= 1215 : 360 = 27 : 8 = 33 : 23

  11. Similar Squares Example

  12. Change in Dimension Example • The dimensions of a water touch tank at the local aquarium are doubled. What is the volume of the new tank?

  13. To find the scale factor of the two cubes, find the ratio of the two volumes. Finding the scale factor of similar solids Write ratio of volumes. Use a calculator to take the cube root. Simplify. • So, the two cubes have a scale factor of 2:3.

  14. Swimming pools. Two swimming pools are similar with a scale factor of 3:4. The amount of chlorine mixture to be added is proportional to the volume of water in the pool. If two cups of chlorine mixture are needed for the smaller pool, how much of the chlorine mixture is needed for the larger pool? Comparing Similar Solids

  15. Solution: • Using the scale factor, the ratio of the volume of the smaller pool to the volume of the larger pool is as follows: • The ratio of the volumes of the mixture is 1:2.4. The amount of the chlorine mixture for the larger pool can be found by multiplying the amount of the chlorine mixture for the smaller pool by 2.4 as follows: 2(2.4) = 4.8 c. • So the larger pool needs 4.8 cups of the chlorine mixture.

More Related