Algebra 1 Common Core Student Edition, Grade 8-9

Mm,

How do you raise a

number in scientific

notation to a power?

A number writ t en in

sci en t i f i c no t at i o n i s a

product. Use the property

for raising a product to

a po wer.

Raisin g a N u m b er in Scien t ific N o t at io n t o a Po w er

Aircraft The expression \mv2 gives the kinetic energy, in joules, of an object with a

mass of m kg traveling at a speed of v meters per second. What is the kinetic energy^

of an experimental unmanned jet with a mass of 1.3 x 103 kg traveling at a speed of

about 3.1 x 103 m/s?

Substitute the values for m

and v into the expression.

Rai se t h e t w o f ac t o r s t o t h e seco n d p o wer.

Multiply the exponents of a power raised to a power.

Use t he Co mmut at ive Propert y of M ul t i p l icat io n.

Add exponents of powers wit h the same base.

Si m p l i f y. W r i t e i n sc i e n t i f i c n o t a t i o n.

l 2 1

2mv = 2

1

2

= 1

2

= 1

2

_ 1

2

(1.3 X 103 )(3.1 X 10 3) 2

1.3 • 10 3 • 3.1 2 • (103) 2

1.3 • 10 3 • 3.1 2 • 10 6

1.3 • 3.1 2 • 10 3 • 10 6

1.3 • 3.1 2 • 103+6

6.2465 X 10s

The aircraft has a kinetic energy of about 6.2 X 10 joules.

Go t It? 5. What is the kinetic energy of an aircraft with a mass of 2.5 X 105 kg traveling

at a speed of 3 X 102 m/s?

Lesso n Ch eck

Do yo u k n o w H OW?

Simplify each expression.

1. (n3) 6 2. (b-7)3

3. (3fl^)4 4. (9x5)2(x2)5

Simplify each expression. Write each answer in

scientific notation.

5. (4 X 10 5) 2 6. (2 X 1(T3)5

\

_ /{^MATHEMATICAL

Do yo u UN DERSTAN D? PRA CTICES

^ 7. Vocabulary Compare and contrast the property

for raising a power to a power and the property for

multiplying powers with the same base.

@ 8. Er r o r A n al y si s One student simplified x 5 + x 5 to

x10. A second student simplified x 5 + x 5 to 2x5.

Which student is correct? Explain.

^ 9. Open-Ended Write four different expressions that are

equivalent to (x^)3.

Pr act i ce

Pr act i ce an d Pr o b l em - So l v i n g Ex er ci ses

Simplify each expression.

10. (n8) 4 11. (n4) 8

14. (u/7)-1 1 5. (xi)“5


15. («i) 3 c 4 19. (c 3 )5(d3)°

MATHEMATICAL

PRA CTICES

12. (c2)J

16. d (r T2)“ 9

20. {t2T \ t2r 5

Se e Pr o b l e m s 1 an d 2.

13. (xt)10


14. (z8)°Z2

21. (m 3 )_ 1 (x5)J

436 Ch a p t e r 7 Ex p o n e n t s a n d Ex p o n e n t i a l Fu n c t i o n s