Exponents
Scientific Notation
Computing Scientific Notation
Square roots and rational numbers
Solving Equations
100

x3(x6)

x9

100

1.62 x 104 in standard form

16,200

100

9.9 x 105/3.3 x 102

3 x 103

100

Find the square(s) of 64

8 and -8

100

Solve for x. 

3x + 10 = 8x - 5

x = 3

200

(y2)5

y10
200

4.86 x 10-3 in standard form

.00486

200

(3.4 x 104)(6.7 x 102)

2.278 x 107 

200

What is the square root of 222, approximated to the hundredths place

14.89 or 14.90

200
Solve for q.


1/5q = 9 - 2/5q

q = 15

300

35/34

31 or 3

300

2,300,000 in scientific notation

2.3 x 106

300

9.6 x 104 - 3.7 x 103

9.23 x 104

300

What is a rational number?

A number that can be written as the ratio a/b, where b is not zero.

300

Solve for q.

20 + 8(q-11) = -12

q = 7

400

70

1

400

.000789 in scientific notation

7.89 x 10-4

400

2.3 x 103 + 4.6 x 102

2.76 x 103

400

Give an example of a irrational number

any imperfect square or never ending, non repeating decimal

400

Solve for x.

1/2(12x + 4) = 6x + 4 + (-2)

Infinite solutions

500
3-3

1/33 or 1/27

500

A patient has 0.0000075 grams of iron in 1 liter of blood. The normal level is between 6 x 10-7 and 

1 x 10-5 grams. Is the pateitns iron level normal? Explain. 

Yes, the patient has 7.5 x 10-6 grams, which falls within the range. 

500

Fill in the blank:

3.45 x 10-7 = .000345 x 10____

-3

500
Classify the number -3 with as many classifications as possible. 

Real, Rational, Integer 

500

Solve for x.

6(5 - 2x) = -4(3x + 1)

NO SOLUTION

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