1 / 16

Lesson Menu

Lesson Menu. Main Idea Key Concept: Power of a Power Example 1: Find the Power of a Power Example 2: Find the Power of a Power Key Concept: Power of a Product Example 3: Power of a Product Example 4: Power of a Product Example 5: Real-World Example.

francesk
Télécharger la présentation

Lesson Menu

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. Lesson Menu Main Idea Key Concept: Power of a Power Example 1: Find the Power of a Power Example 2: Find the Power of a Power Key Concept: Power of a Product Example 3: Power of a Product Example 4: Power of a Product Example 5: Real-World Example

  2. Use laws of exponents to find powers of monomials. Main Idea/Vocabulary

  3. Key Concept

  4. Find the Power of a Power Simplify (52)8. (52)8 = 52•8Power of a Power = 516 Simplify. Answer: 516 Example 1

  5. Simplify (79)3. A. 73 B. 76 C. 712 D. 727 Example 1 CYP

  6. Find the Power of a Power Simplify (a3)7. (a3)7 = a3• 7Power of a Power = a21 Simplify. Answer: a21 Example 2

  7. Simplify (d5)5. A.d25 B.d5 C.d1 D.d0 Example 2 CYP

  8. Key Concept 3

  9. Power of a Product Simplify (3c4)3. (3c4)3 = 33•c4•3Power of a Product = 27c12 Simplify. Answer: 27c12 Example 3

  10. Simplify (8r7)2. A. 8r14 B. 16r14 C. 64r9 D. 64r14 Example 3 CYP

  11. Power of a Product Simplify (–4p5q)2. (–4p5q)2 = (–4)2•p5•2•q2 Power of a Product = 16p10q2 Simplify. Answer: 16p10q2 Example 4

  12. Simplify (–6s2t9)3. A. –216s6t27 B. –216s5t12 C. –18s6t27 D. –18s5t12 Example 4 CYP

  13. GEOMETRY Find the volume of a cube with side lengths of 6mn7. Express as a monomial. V = s3 Volume of a cube V = (6mn7)3Replace s with 6mn7. V = 63(m1)3(n7)3 Power of a Product V = 216m3n21 Simplify. Answer: The volume of the cube is 216m3n21 cubic units. Example 5

  14. GEOMETRY Find the area of a square with side lengths of 5q8r5. Express as a monomial. A. 10q10r7 B. 10q16r10 C. 25q10r7 D. 25q16r10 Example 5 CYP

More Related