How to identify quadratic functions:
Standardform: ax² + bx + cy² + dy + e= 0
If you have an equation like 4x² + 4y²=36 The equation is a circle, because a=c
Example of a circle
If a or c equals 0 the equation is a parabola (for example: 2x² + 4y= 3)
Example of a parabola:
If a or c have different signs the equation is a hperbola ( for example: 4x² - 4y²= 12)
Example of a hyperbola
If you have an equation like 4x² + 3y²= 25 the equations is an ellipse, because a is not equal to c and the signs are the same
Example of an ellipse
Sunday, November 7, 2010
Multiplying Matrices
Scalar multiplication is when you distribute the number outside the matrix to all the numbers inside the brackets.
To multiply matrices, you first need to write a dimension statement. The dimension statement basically states that the columns of the first matrix must match the rows of the other matrix
2x2*2x2
To multiply matrices, you first need to write a dimension statement. The dimension statement basically states that the columns of the first matrix must match the rows of the other matrix
2x2*2x2
2x2 2x2
The numbers underlined show that the matrices can be multiplied, since the inside numbers are the same.
The bolded numbers become the dimensions of the new matrix.
More specifically, you would multiply the first number of the first row on the first matrix with the first number of the first column of the second matrix. You then add the products together and that's the first number of the product matrix. You repeat this until all the numbers of both the matrices have been multiplied, giving you your product matrix.
Thursday, October 28, 2010
3D Grapher! :)
http://www.livephysics.com/ptools/online-3d-function-grapher.php#add
(becauses Blogger hates the fact that I'm stealing code....)
(becauses Blogger hates the fact that I'm stealing code....)
Tuesday, September 21, 2010
Dimensions of a Matrix
The dimensions of a matrix refer to the number of rows and number columns of a given matrix.
The rows of a Marix go horizontally.
The columns of a Marix go vertically.
To find the dimensions of a matrix you must multiply the (number of rows x the number of columns). All three of these above matrices would be 2x3 (or 2 by 3).
The rows of a Marix go horizontally.
To find the dimensions of a matrix you must multiply the (number of rows x the number of columns). All three of these above matrices would be 2x3 (or 2 by 3).
Tuesday, September 14, 2010
Error Analysis
The value of x is going up by 5, so the slope should be 2 and not 10/1. By plugging in the points, the final equation should be solved. With this answer, y is not equal to 9+10x in the t-chart.
In order for a point to be the solution to a system, it has to solve both equations. So point (1,-2) solves the first equation, but not the second equation.
For problem #22 the shading is right, but the line should be dotted, not soild. For problem #23 the solid line is right, but the shading should be above it, not below it.
For problem #20 the shading is correct, but the line should be dotted not solid. For problem #21 the sloid line is right, but the shading should be below it not above it.
Tuesday, August 31, 2010
Monday, August 30, 2010
Systems of Equations
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