If you missed class today (Mon Dec. 16th) please check the video links below on how to solve problems with the quadratic formula and how to simplify expressions with imaginary numbers.
How to Solve with Quadratic Formula:
How to Simplify with Imaginary Numbers:
Monday, December 16, 2013
Saturday, December 14, 2013
Review Week for the Semester Exam (12/12 Through 12/18)
Hello algebra two students! We are done learning new material for the nine weeks and have entered the review period. Semester exams are the 19th and 20th. Here is our review schedule:
Thurs 12/12: Graphing review (parabolas, piecewise, inequalities, 3-d coordinate plane)
Fri 12/13: Matrices review (determinants, inverses, identities, solving for variables)
Mon: 12/16: Quadratic formula and imaginary numbers
Tues 12/17: Factoring (GCF, trinomials, dividing trinomials)
Wed 12/18: Exponent Rules, semester wrap-up
If you need help AT ALL please come and see me during a time that we are both free. I am more than happy to help you out, just communicate to me that you need it. Review sheets are going to be due on Wednesday. I will release some practice problems on Wednesday to help you study more. Good luck and happy studying!
Thurs 12/12: Graphing review (parabolas, piecewise, inequalities, 3-d coordinate plane)
Fri 12/13: Matrices review (determinants, inverses, identities, solving for variables)
Mon: 12/16: Quadratic formula and imaginary numbers
Tues 12/17: Factoring (GCF, trinomials, dividing trinomials)
Wed 12/18: Exponent Rules, semester wrap-up
If you need help AT ALL please come and see me during a time that we are both free. I am more than happy to help you out, just communicate to me that you need it. Review sheets are going to be due on Wednesday. I will release some practice problems on Wednesday to help you study more. Good luck and happy studying!
Tuesday, December 3, 2013
Negative Rational Exponents and Solving Rational Equations
Negative rational (fraction) exponents are just like regular negative exponents. To get rid of a negative exponent, we put it on the other side of the fraction bar. Likewise, whenever we see a negative fraction exponent, move it (and the base number) to the other side of the fraction bar to make it positive, then solve as usual. Easy!
To see an example of this, click below:
Rational Equations are equations with powers in them. For example, we could see something like x^5 = 243. To solve these types of equations, we need to think OPPOSITES:
x^2 is the opposite of radical 2.
x^3 is the opposite of radical 3.
x^4 is the opposite of radical 4.
x^5 is the opposite of radical 5.....and so on. Do the opposite to each side until you get x by itself.
To see an example of how to solve a rational equation, click below:
To see an example of this, click below:
Rational Equations are equations with powers in them. For example, we could see something like x^5 = 243. To solve these types of equations, we need to think OPPOSITES:
x^2 is the opposite of radical 2.
x^3 is the opposite of radical 3.
x^4 is the opposite of radical 4.
x^5 is the opposite of radical 5.....and so on. Do the opposite to each side until you get x by itself.
To see an example of how to solve a rational equation, click below:
Monday, December 2, 2013
Rational exponents
Rational exponents are exponents that are fractions. We re-write them so that the top number is an exponent and the bottom number is a radical. Then, we simplify both the exponent and the radical to get our answer. Note that order doesn't matter - you can do either the exponent or the radical first and you will get the same answer.
For a video example on how to do this, click here:
http://www.educreations.com/lesson/view/rational-exponents/14387309/?s=CO1gBl&ref=app
For a video example on how to do this, click here:
http://www.educreations.com/lesson/view/rational-exponents/14387309/?s=CO1gBl&ref=app
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