§4.2, Number Bases in Positional Systems

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Presentation transcript:

§4.2, Number Bases in Positional Systems

Learning Targets I will change numerals in bases other than ten to base ten. I will change base ten numerals to numerals in other bases. 2

Changing Numerals in Bases Other Than Ten to Base Ten The base of a positional numeration system refers to the number whose powers define the place values. The place values in a base five system are powers of five: …,54, 53, 52, 51, 1 =…,5 × 5 × 5 × 5, 5 × 5 × 5, 5 × 5, 5, 1 =…,625, 125, 25, 5, 1 3

Changing to Base Ten To change a numeral in a base other than ten to a base ten numeral, Find the place value for each digit in the numeral. Multiply each digit in the numeral by its respective place value. Find the sum of the products in step 2. 4

Example 1: Converting to Base Ten Convert 4726eight to base ten. Solution: The given base eight numeral has four places. From left to right, the place values are 83, 82, 81, and 1 Find the place value for each digit in the numeral: 5

Example 1 continued Multiply each digit in the numeral by its respective place value. Practice: pg 206 #7, 9 6

Pg 206, #17 Base 16 has 16 digits: 0, 1, 2, 3, 4, 5, 6, 7, 8, 9, A, B, C, D, E, F where A = 10, B = 11, C = 12, D = 13, E = 14, and F = 15. So, converting ACE5sixteen is done as follows: A: 10 x 163 = 40,960 C: 12 x 162 = 3,072 E: 14 x 161 = 224 5: 5 x 160 = +5 So, converting ACE5sixteen = 44,261 in base 10.

Changing Base Ten Numerals to Numerals in Other Bases We use division to determine how many groups of each place value are contained in a base ten numeral. 8

Example 2: Using Division to Convert from Base Ten to Base Eight Convert the base ten numeral 299 to a base eight numeral. Solution: The place values in base eight are …,83, 82 ,81 ,1 , or …,512, 64, 8, 1. The place values that are less than 299 are 64, 8, and 1. We use division to show how many groups of each of these place values are contained in 288. 9

Example 2 continued These divisions show that 299 can be expressed as 4 groups of 64, 5 groups of 8 and 3 ones: 10

Example 3: Using Divisions to Convert from Base Ten to Base Six Convert the base ten numeral 3444 to a base six numeral. Solution: The place values in base six are …65, 64, 63,62, 61, 1, or …7776, 1296, 216, 36, 6, 1. We use the powers of 6 that are less than 3444 and perform successive divisions by these powers. 11

Example 3 continued Using these four quotients and the final remainder, we can immediately write the answer. Practice, pg 206, #31, 35, 37 Homework: Pg 206, #10 – 38 (e) 12