1 / 22

Please open your laptops, log in to the MyMathLab course web site, and open Daily Quiz 11.

Please open your laptops, log in to the MyMathLab course web site, and open Daily Quiz 11. IMPORTANT NOTE : If you have time left out of your five minutes after you finish the two problems on this quiz, use it to check your answers before you submit the quiz!.

nitesh
Télécharger la présentation

Please open your laptops, log in to the MyMathLab course web site, and open Daily Quiz 11.

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript


  1. Please open your laptops, log in to the MyMathLab course web site, and open Daily Quiz 11. • IMPORTANT NOTE: If you have time left out of your five minutes after you finish the two problems on this quiz, use it to check your answers before you submit the quiz! • A scientific calculator may be used on this quiz. • Remember to turn in your answer sheetto the TA when the quiz time is up.

  2. Please CLOSE YOUR LAPTOPS, and turn off and put away your cell phones, and get out your note-taking materials.

  3. A linear equation in two variables: • Is of the form Ax + By = C • A, B, C are real numbers • A & B are not both zero. (It’s OK for one or the other to be zero, just not both at the same time.) This is called the “standard form” of a linear equation. • “Standard form” has the x and y terms on the left and the constant (number) term on right, and usually, all fractions cleared away by multiplying by LCD. • (We’ll also be studying two other forms of a linear equation: “slope-intercept” form and “point-slope” form.)

  4. Graphing linear equations: • Find at least 2 points on the line. • Connect the points to form a line. Example: Graph the linear equation 2x - y = -4. Process: Find two ordered pair solutions (and a third solution as a check of the computations) by choosing a value for one of the variables, xor y, then solving for the other variable. We plot the solution points, then draw the line containing the 3 points.

  5. Example (cont.) Graph the linear equation 2x - y = -4. (NOTE: You can pick any number you want for x, so pick something simple and easy, like 0 or 1 or 2 or -1 or -2.) Let x = 1. Then 2x - y = -4 becomes 2(1) – y = -4 (replace x with 1) 2 – y = -4 (simplify the left side) -y = -4 – 2 = -6 (subtract 2 from both sides) y = 6 (multiply both sides by -1) So one solution is (1, 6).

  6. Example (cont.) Graph the linear equation 2x - y = -4. For the second solution, let y = 4. (Could be any number you choose.) Then 2x - y = -4 becomes 2x – 4 = -4 (replace y with 4) 2x = -4 + 4 (add 4 to both sides) 2x = 0 (simplify the right side) x = 0 (divide both sides by 2) A second solution is (0, 4).

  7. Example (cont.) Graph the linear equation 2x - y = -4. For the third solution, let x = -3. (Could be any number you choose.) Then 2x - y = -4 becomes 2(-3) – y = -4 (replace x with -3) -6 – y = -4 (simplify the left side) -y = -4 + 6 = 2 (add 6 to both sides) y = -2 (multiply both sides by -1) A third solution is (-3, -2). (Note: different people would probably pick different numbers and get three different points, and they’d still come out with the same graphed line.)

  8. y (1, 6) (0, 4) x (-3, -2) Now we plot all three of the solutions (1, 6), (0, 4) and (-3, -2). And then we draw the line that contains the three points.

  9. Helpful Hint • When graphing a linear equation in two variables: • if it is solved for y, it may be easier to find ordered pair solutions by choosing x-values. • If it is solved for x, it may be easier to find ordered pair solutions by choosing y-values.

  10. Example Graph the linear equation y = x + 3. Since the equation is solved for y, we should choose values for x. To avoid fractions, we should select values of xthat are multiples of 4 (the denominator of the fraction). (The online graphing tool can’t graph fraction coordinates, so you need to select values of x and y that will make both coordinates integers.)

  11. Example (cont.) Graph the linear equation y = x + 3. Then y = x + 3 becomes y = (4) + 3 (replace x with 4) Let x = 4. y = 3 + 3 = 6 (simplify the right side) One solution is (4, 6).

  12. Example (cont.) Graph the linear equation y = x + 3. Then y = x + 3 becomes y = (0) + 3 (replace x with 0) For the second solution, let x = 0. (Zero is always a good, easy-to-graph number to pick for one of your values.) y = 0 + 3 = 3 (simplify the right side) A second solution is (0, 3).

  13. Example (cont.) Graph the linear equation y = x + 3. Then y = x + 3 becomes y = (-4) + 3 (replace x with -4) For the third solution, let x = -4. y = -3 + 3 = 0 (simplify the right side) A third solution is (-4, 0).

  14. y (4, 6) (0, 3) x (-4, 0) Now we plot all three of the solutions (4, 6), (0, 3) and (-4, 0). And then we draw the line that contains the three points.

  15. Question: Can we classify an equation like x = 5 or y = -11 as a “linear equation in two variables”? Recall the definition of a linear equation in two variables: • It is of the form Ax + By = C • A, B, C are real numbers • A & B are not both zero. (It’s OK for one or the other to be zero, just not both at the same time.) • So back to the question: • Can we callx = 5 and y = -11“linear equation in two variables”? • What would their graphs look like in 2 variables?

  16. Example: Graph the linear equation y = 3 on a two-variable graph grid. • Notice that the equation can be written in standard form as 0x + y = 3. • No matter what value we replace x with, y is always 3.

  17. Besides linear equations, we will also examine the graphs of quadratic equations, absolute value equations and other nonlinear equations in later sections. Non-linear simply means the graph is not a straight line.

  18. One type of a non-linear equation is the quadratic. • A quadratic has ONE of the variables squared (we’ll use x as the squared variable for examples in this section). • The graph of a quadratic equation is shaped like a “U” with the ends either pointing upwards (like a cup) or downwards (like a hill.) • To graph a quadratic equation, plug values in the equation for the xand calculate the corresponding y values to get the ordered pairs to plot as the points on your graph. • You might need a LOT of points – go until you find where the graph reaches a turning point and starts curving back in the other direction.

  19. Example y xy (2, 4) (-2, 4) x (-1, -2) (1, -2) (0, -4) Graph y = 2x2 – 4. 2 4 1 -2 0 -4 -1 -2 -2 4

  20. Application problem from today’s homework that can be solved by graphing:

  21. The assignment on this material (HW 12) Is due at the start of the next class session. Lab hours: Mondays through Thursdays 8:00 a.m. to 7:30 p.m. Please remember to sign in on the Math 110 clipboard by the front door of the lab

  22. You may now OPEN your LAPTOPS and begin working on the homework assignment. We expect all students to stay in the classroom to work on your homework till the end of the 55-minute class period. If you have already finished the homework assignment for today’s section, you should work ahead on the next one or work on the next practice quiz/test.

More Related