January 8‚ 2013 Algebra 2 Well what I like about this class is that when ever I have a question you will answer me and when ever I don’t understand something you would try to explain it t me again .I know I would get frustrated but that’s because I have too much stress. What I didn’t like the class was when we learned about the F.O.I.L it confuse me at the end when you have to put all number and variable together. The other thing I didn’t like is some people in the class room are not
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I met with my College Algebra Professor‚ Sarah Hawkins on October 12‚ 2016 at 11 am. The reason I met with her was to discuss my grade in College Algebra and to improve it. I also discussed upcoming tests and how to study for them. When I first walked into her office I was really down about my grade because I recently failed my first test and it brought my average really down. I asked if there was any way I can bring my grade up and she told me how a student can retake one test out of three for
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Algebra 222 week 3 Quiz CLOSE WINDOW Week 3: Radicals and Rational Exponents‚ Date Submitted: 10/16/2014 1. Simplifying a sum or difference of radical expressions: Multivariate Simplify as much as possible. +8y48w3w3wy2 Assume that all variables represent positive real numbers. You answered correctly: 33wy3w 2. Rationalizing the denominator of a radical expression Rationalize the denominator and simplify. 611 You answered: 6611 Your answer is incorrect. The correct answer is:
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Name of Property Example Explanation Zero Exponent Property x0 = 1 (x ≠ 0) Any number (except 0) with an exponent of 0 equals 1. Negative Exponent Property x−n = 1 xn (x ≠ 0) Any number raised to a negative power is equivalent to the reciprocal of the positive exponent of the number. Product of Powers Property xn•xm = xn+m (x ≠ 0) To multiply two powers with the same base‚ add the exponents. Quotient of Powers Property xn xm = xn−m (x ≠ 0) To divide two powers with the same base‚ subtract the exponents
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Mr. Gershwin is trying to find the right size grand piano to fit into his Room. The size of the room in his apartment is represented by a rectangle whose sides are described by the expressions 4x – 4 and 8x – 8. Introduction I believe the aim of the investigation was to find a perfect sized piano for Mr. Gershwin’s apartment. Mathematical Investigations 1. Mr Gershwin wants to buy a rectangular piano which is half the width and length of the room. Find the expressions for the length of each
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~61E LINEAR ALGEBRA QUESTION ı The blanks below will be filled by students. i Name: Surname: Signature: 22 MAY 2013 FINAL i Electronic Group Number: \ List Number: Post( e-mail) address: For the solution of this question (Except the score) Score Student Number: please use only the front face and if necessary the back face of this page. [ı2 pts] (a) Find the transition matrix from the ordered basis [(ı‚ ı‚ ı)T‚ (ı‚ 0‚ O)T‚ (0‚2‚ ı)T] of R3 to the ordered
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Algebra 222 week 4 Quiz CLOSE WINDOW Week 4: Quadratic Equations and Functions‚ Date Submitted: 10/26/2014 1. Finding the roots of a quadratic equation with leading coefficient 1 Solve for y . =+y2−3y40 If there is more than one solution‚ separate them with commas. If there is no solution‚ click on "No solution." You answered correctly: =y− 4‚1 2. Finding the roots of a quadratic equation with leading coefficient greater than 1 Solve for v . =2v2+3v2 If there is more than one solution
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cheddar cheese and 3 lbs of chicken loaf. He paid $26.35. Mrs. Hsing paid $18.35 for 1.5 lbs of cheese and 2 lbs of chicken loaf. What was the price per pound of each item? $4.70 per lb of cheese‚ $5.65 per lb of chicken loaf Prentice Hall Algebra 2 • Extra Practice Copyright © by Pearson Education‚ Inc.‚ or its affiliates. All Rights Reserved. 9 Name Class Date Extra Practice (continued) Chapter 3 Lesson 3-2 Solve each system of equations. 12. e x 1 y 5 25 x 2 y 5
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1. Solve S = 4v2 for v s = 4v² √s = 2v (√s)/2 = v 2. Solve M = 2x + 3y for y. -2x m-2x=3y /3y (m-2x)/3=3 3. Solve t = p+3r/6 for r. /6 6t=p+3r -p 6t-p=3r /3 (6t-p)/3=r 4. Solve V = π r2h for h. /pir^2 H=v/πr^2 5. Solve P = 2(l + w) for l. What are the missing values in the table? P w l 14 2 5 22 8 3 6. Create your own unique literal equation and solve for one of the variables. Show your work. Then‚ using complete sentences‚ explain how you solved for
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titled “Basic Algebra Skills-Real numbers & Algebraic Equations‚ Exponents & Scientific Notation‚ Radicals & Radical Exponents‚ and Polynomials”. I chose this presentation because I felt I needed to remember algebraic equations‚ exponents and polynomials. I have not had algebra for many years so this presentation was a very good refresher. It reminded me about real numbers and algebraic expressions and square roots. It was good to be reminded about the steps you take in algebra to solve an equation
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