Examples of canonical form in the following topics:
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- Using elementary operations, Gaussian elimination reduces matrices to row echelon form.
- Upper triangle form: A square matrix is called upper triangular if all the entries below the main diagonal are zero.
- Use elementary row operations on the augmented matrix $[A|b]$ to transform $A$ to upper triangle form.
- It is now in reduced row echelon form, or row canonical form.
- Use elementary row operations to put a matrix in simplified form
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- Matrices containing zeros below each pivot are said to be in row echelon form.
- In diagonal form, we remove any zeros from the diagonal and add them below and above.
- Use elementary row operations on matrix [A|b] to transform A into diagonal form.
- Then, use elementary row operations to transform A into diagonal form:
- A matrix is in reduced row echelon form (also called row canonical form) if it is the result of a Gauss–Jordan elimination.
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- You may have noticed that we had been given inequalities, such as $3a+2b+c \leq 10$, but standard form calls for equalities, or equations.
- Standard form also requires the objective function to be a minimization.
- A linear program in standard form can be represented as a tableau of the form
- If the columns of A can be rearranged so that it contains the p-by-p identity matrix (the number of rows in A), then the tableau is said to be in canonical form.
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- Quadratic equations may take various forms.
- You have already seen the standard form:
- Another common form is called vertex form, because when a quadratic is written in this form, it is very easy to tell where its vertex is located.
- The vertex form is given by:
- It is more difficult to convert from standard form to vertex form.
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- Another way of arranging a linear equation is in standard form.
- In the standard form, a linear equation is written as:
- For example, consider an equation in slope-intercept form: $y = -12x +5$.
- However, the zero of the equation is not immediately obvious when the linear equation is in this form.
- Convert linear equations to standard form and explain why it is useful to do so
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- One of the most common representations for a line is with the slope-intercept form.
- Writing an equation in slope-intercept form is valuable since from the form it is easy to identify the slope and $y$-intercept.
- Let's write an equation in slope-intercept form with $m=-\frac{2}{3}$, and $b=3$.
- If an equation is not in slope-intercept form, solve for $y$ and rewrite the equation.
- Finally, divide all terms by $-6$ to get the slope-intercept form $y=2x-1$.
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- The standard form of a quadratic equation is useful for completing the square, which is used to graph the equation.
- Completing the square is a technique for converting a quadratic polynomial of the form:
- The expression inside the parenthesis is of the form (x − constant).
- This form of quadratic equation is known as the "standard form" for graphing parabolas in algebra; from this equation, it is simple to determine the x-intercepts (y = 0) of the parabola, a process known as "solving" the quadratic equation.
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- Quadratic equations are second order polynomials, and have the form $f(x)=ax^2+bx+c$.
- A quadratic function is of the general form:
- Quadratic functions can be expressed in many different forms.
- The form written above is called standard form.
- is known as factored form, where $x_1$ and $x_2$ are the zeros, or roots, of the equation.
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- Write an equation of a line in Point-Slope Form (given a point and a slope) Convert to Slope-Intercept Form
- Write an equation of a line in Point-Slope Form (given two points) Convert to Slope-Intercept Form
- Converting to slope-intercept form means to solve the equation for $y$.
- The only difference is the form that they are written in.
- Use point-slope form to find the equation of a line passing through two points and verify that it is equivalent to the slope-intercept form of the equation