Chapter 10 Math Basics

Look at the following problem: How many even prime numbers are there between 0 and 100. A. 0 B. 1 C. 2 D. 3 E. 4

The answer is (B) If you know what the terms even and prime mean, then this problem is a snap. Without knowledge of the problem is impossible. We will begin our math review by going over all the basic terms and operations covered on the ACT.

MATH TERMINOLOGY Make sure that you are familiar with math terminology. Many partial answers rely on the misinterpretation of key terms; don’t be a vicitm!

Basic Terms: Real numbers Real numbers are all the number you think of when you think of numbers. 5, ¼, 7.9, √2, are all real numbers They include everything except imaginary numbers, which appear only occasionally on the ACT.

Basic terms: rational numbers Any number that can be written as a whole number, a fraction, or a repeating decimal is a rational number. 5, 1/5, and .333 are rational numbers Most of the numbers you’ll see on th ACT are rational numbers

Basic terms: irrational numbers An irrational number cannot be written as an integer over another integer. ∏ is irrational and like other irrational numbers it goes on forever. Other irrational numbers include any square root of a number that does not have a perfect square root. √3 and √2 are irrational, but √4, which simplifies to 2 is rational

Basic terms: integers Integers include everything except what we normally think of as fractions or decimals. 2, 134, -56, 0 and 7 are all integers

Basic terms: positive and negative Positive numbers are to the right of the 0 on a number line and negative numbers are to the left of the 0 on the number line. Zero itself is neither positive or negative There are 3 rules for positive and negative multiplication positive x positive = positive positive x negative = negative negative x negative = positive

Basic terms: even and odd numbers Even numbers are numbers that can be divided by 2 ( with no remainder) Odd numbers are integers that cannot be divided evenly by 2 NOTE that 0 is even

Basic terms: digits There are ten digits: 0,1,2,3,4,5,6,7,8,9 The number 364 has three digits – 3 ,6 and 4. 4 is called the ones digit, 6 is the tens digit, and 3 is the hundreds digit. Other digits include tenths, digit, hundredths digit, and thousandths digit

Basic terms: prime numbers A prime number can be divided evenly by two and only two distinct factors – 1 and itself. Thus 2,3,5,7,11,13 are all prime numbers The number 2 is the only even prime number Neither 0 nor 1 are prime numbers There are no negative prime numbers

Basic terms: Absolute value The absolute value of a number is the distance between that number and 0 on the number line.

Basic terms: variables and coefficients In the expression 3x + 4y, the x and y are called variables because we don’t know what they are. 3 and 4 are called coefficients because you multiply the variables by them.

BASIC OPERATIONS Knowing the rules of divisibility can be very useful on the ACT. The rules are as follows: 1. A number is divisible by 2 if its ones digit can be divided evenly by 2. In other words it is an even number. 2. A number is divisible by 3 if the sum of its digits can be divided evenly by 3.

Divisibility rules continued 3. A number is divisible by 4 if its last two digits forms a number that is divisible by 4. 4. A number is divisible by 5 if its last digit is a 5 or 0. 5. A number is divisible by 6 if it is also divisible by 2 and 3. 6. A number is divisible by 8 if the number formed by its last 3 digits is divisible by 8

Divisibility rules continues A number is divisible by 9 if the sum of its digits can be divided evenly by 9.

Factors and Multiples A number is a factor of another number if it can be divided evenly into that number. A number is a multiple of that number if it can be divided evenly by that number. All integers have a limited number of factors and an infinite number of multiples. FACTORS FEW, MULTIPLES MANY

Exponents An exponent is a short hand way of writing the value of a number multiplied several times by itself. The larger number is called the base and the upper number is called the exponent.

Multiplying numbers with the same base When you multiply numbers that have the same base, you simply add the exponents

Dividing numbers with the same base When dividing exponents with the same base, you simple subtract the bottom exponent from the top exponent.

Negative powers A negative power is simply the reciprocal of a positive power.

Fractional powers When a number is raised to a fractional power, the numerator functions like a real exponent, and the denominator functions as the index.

Raising a power to a power When you raise a power to a power you simply multiply the exponents

The Zero Power ANYTHING to the zero power is 1

The First Power ANYTHING to the power of 1 is itself

Distributing exponents When several numbers are inside parenthesis, the exponent outside the parenthesis must be distributed to all of the numbers within.

But watch out for… Exponents are shorthand for multiplication, so the rules apply only when you multiply or divide the same base.

Radicals The square root of a positive number x is the number that when squared, equals x. On the ACT you will not have to worry about negative exponents. The cubed root of a positive number x is the number that, when cubed, equals x.

Radicals Be sure that you know how to use you calculator more than just the square root and simple exponents. The ACT is going to have fractional exponents, negative exponents, and all sorts of weird roots.

Chapter 10 Math Basics

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Chapter 10 Math Basics