Oh no! I think she’s going to say the “F” word! I’m afraid!

Slides:

Advertisements

Similar presentations

10-10 Complex Rational Expressions Standard 13.0 Standard 13.0 One Key Term One Key Term.

Advertisements

Limits at Infinity (End Behavior) Section 2.3 Some Basic Limits to Know Lets look at the graph of What happens at x approaches -? What happens as x approaches.

Multiplying and Dividing Rational Numbers

By JESUS GOMEZ. * HAVE SAME DENOMINATORS. * HAVE DIFFERENT NUMERATORS. * ADD ONLY NUMERATORS. * LEAVE DENOMINATORS ALONE. * HAVE SAME DENOMINATORS. *

6-3: Complex Rational Expressions complex rational expression (fraction) – contains a fraction in its numerator, denominator, or both.

Fractions.  The Numerator is the number on top  The Denominator is the number on bottom  The Factors of a number are those numbers that will divide.

Equivalent Rational Expressions Example 1: When we multiply both the numerator and the denominator of a rational number by the same non-zero value, we.

Changing Percents to a Fraction #3 To change a percent to a fraction you need to first write the numerator over 100. Next simplify the fraction.

Adding, subtracting, multiplying, and dividing fractions

Fraction Multiplication And Cancelation. Fraction Multiplication Here are some fraction multiplication problems Can you tell how to multiply fraction.

Multiplying & Dividing Rational Expressions. Simplified form of a rational expression - Means the numerator and denominator have NO common factors. To.

Lesson 8-1: Multiplying and Dividing Rational Expressions

Example 3 Dividing Mixed Numbers ÷ – 3 19 = 17 6 – Multiply by the reciprocal of 17 6 – 6 – = 3 () 6 – 19 Use rule for multiplying fractions.

P.4: Fractional Expressions Unit P: Prerequisites for Algebra 5-Trig.

Adding, Subtracting, Multiplying, & Dividing Rational Expressions

Notes Over 9.4 Simplifying a Rational Expression Simplify the expression if possible. Rational Expression A fraction whose numerator and denominator are.

Chapter 9: Rational Expressions Section 9-1: Multiplying and Dividing Rationals 1.A Rational Expression is a ratio of two polynomial expressions. (fraction)

Section 9-3a Multiplying and Dividing Rational Expressions.

 Multiply rational expressions.  Use the same properties to multiply and divide rational expressions as you would with numerical fractions.

Dividing Fractions and Mixed Numbers Objective: Learn to divide fractions and mixed numbers.

Measurement Multiplying and Dividing Fractions.  We can add and subtract fractions with the same (common) denominator easily. Adding and Subtracting.

MULTIPLY and DIVIDE RATIONAL NUMBERS. MULTPILYING MIXED NUMBERS 1)Change all Mixed numbers to improper fractions 2)Simplify A) Up and Down B) Diagonally.

Rational Expressions – Product & Quotient PRODUCT STEPS : 1. Factor ( if needed ) 2. Simplify any common factors QUOTIENT STEPS : 1. Change the problem.

4. Check that the answer is reduced: The numerator and denominator should not have any common factors besides 1. When the GCF of the numerator and denominator.

MULTIPLYING FRACTIONS

Fraction Easy for you!!

Warm-Up (9/4) Please pick up a warm-up from the front desk and begin working. Please pick up a warm-up from the front desk and begin working. I ONLY WANT.

Fraction Multiplication And Cancelation. Fraction Multiplication Here are some fraction multiplication problems Can you tell how to multiply fraction.

Multiplying and Dividing of Fractions. How to Find a Fraction of a Fraction The first thing to remember is “of” means multiply in mathematics. of = x.

Percent DecimalFraction. Change Percent Into Fraction Write the numerator over one hundred and simplify it. Write 58% as a fraction. 58 ÷ 2 = ÷

Multiplying and Dividing Rational Expressions. Multiplying and Dividing Fractions Multiply Numerators Multiply Denominators Multiply by the reciprocal.

Multiplying Fractions. When we multiply a fraction by an integer we: multiply by the numerator and divide by the denominator For example, × = 54.

Simplify, Multiply & Divide Rational Expressions.

Multiplying AND DIVIDING RATIONAL EXPRESSIONS. Review: Multiplying fractions.

Algebra 11-3 and Simplifying Rational Expressions A rational expression is an algebraic fraction whose numerator and denominator are polynomials.

8.4 Multiply and Divide Rational Expressions

Copyright©amberpasillas2010. For Learning to Happen! Keep your homework out to use as scratch paper. Remove all other thoughts from your mind. Pay close.

Lesson 2-5. Refresher Simplify the following expressions

To simplify a rational expression, divide the numerator and the denominator by a common factor. You are done when you can no longer divide them by a common.

Fractions XIII Multiplication of Whole Numbers. How to Find the Fraction of a Whole Number The first thing to remember is “of” means multiply in mathematics.

Section 6.2 Multiplication and Division. Multiplying Rational Expressions 1) Multiply their numerators and denominators (Do not FOIL or multiply out the.

Operations on Rational Expressions MULTIPLY/DIVIDE/SIMPLIFY.

How do we multiply and divide Rational Expressions?

Multiplying and Dividing Rational Expressions

Do Now: Multiply the expression. Simplify the result.

Solving Complex Fractions and Unit Rates

Simplifying Rational Expressions

Multiplying and Dividing Fractions

Multiplying and Dividing Rational Expressions

SEC. 1-6: Multiplying & dividing real numbers

Chapter 5-4 Multiplying Rational Numbers

Change each Mixed Number to an Improper Fraction.

Rational Expressions. Rational Expressions RATIONALS - - what are they? Ratio of two polynomial expressions Examples include:

Without a calculator, simplify the expressions:

Simplify Complex Rational Expressions

Dividing Fractions Chapter 6 Section 6.5.

Ch 9.3: Multiplying and Dividing Rational Expressions

Multiplying Fractions and Mixed Numbers

Simplifying rational expressions

Dividing Fractions and Mixed Numbers

Multiplying and Dividing Rational Expressions

Which fraction is the same as ?

Divide Rational Expressions

Algebra 1 Section 13.5.

ADD SUBTRACT MULTIPLY DIVIDE KEEP CHANGE FLIP MIXED #S MIXED #S

SLOT Week 11 – Day 1.

9.4 Multiplying & Dividing Rational Expressions

Unit 3: Rational Expressions Dr. Shildneck September 2014

Presentation transcript:

Oh no! I think she’s going to say the “F” word! I’m afraid!

Factoring! Whew! I thought it was going to be “fractions.”

AND fractions! And your little dog, too.

Fractions, and Factors in polynomial expressions, oh my!

Don’t be afraid You’ve had the power all along.

You know how to simplify Fractions If you have 15/50, you know that both the Numerator And the Denominator Have a factor of “5” 5x3=15 and 5x10=50

So you simplify by… Taking out the common factors Take them out

And you are left with a simplified fraction 15/50 Is Reduced To 3/10

You can do the same thing with polynomials

First: FACTOR

Second: Remove those common factors Becomes: Pay no attention to the factors that are the same, they just become “1”

Just because you don’t know what the number is… The rules DO NOT change So, when multiplying fractions, multiply straight across– but be sure to take out common factors first) Becomes: Then just:

It is just the same with polynomials

Factor

Take out the common factors (The parts that make ‘1’) Now that is using your brain.

And that is the “trick”– it is just like working with any other fraction You see, it isn’t really magical at all.

So, when faced with something that looks very complicated, like… Just think of how you would complete the problem if you knew what all the numbers were… 1.Keep-Change-Flip (multiply by the reciprocal) 2.Factor 3.Remove the common factors (that make one)

And you will be where you want to be in no time With your own diploma in Thinkology

All sound clips and pictures from MGM studies “Wizard of Oz” (1939)