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1602 parametric equations
1. The document discusses parametric equations, which express the variables x and y in terms of a third variable called a parameter. Common parameters include s, t, and θ. 2. It provides examples of converting parametric equations to Cartesian form by eliminating the parameter through substitution or trigonometric identities. This includes the equations of circles, parabolas, ellipses, and hyperbolas. 3. Key parametric equations that define common curves are identified, along with the curves they represent. Methods for sketching curves from their parametric equations are also outlined.
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1602 parametric equations
- 1. 41: Parametric Equations41:Parametric Equations © Christine Crisp ““Teach A Level Maths”Teach A Level Maths” Vol. 2: A2 Core ModulesVol. 2: A2 Core Modules
- 2. Parametric Equations Module C4 "Certainimages and/or photos on this presentation are the copyrighted property of JupiterImages and are being used with permission under license. These images and/or photos may not be copied or downloaded without permission from JupiterImages"
- 3. Parametric Equations θθ sin3,cos3== yx The Cartesian equation of a curve in a plane is an equation linking x and y. Some of these equations can be written in a way that is easier to differentiate by using 2 equations, one giving x and one giving y, both in terms of a 3rd variable, the parameter. Letters commonly used for parameters are s, t and θ. ( θ is often used if the parameter is an angle. ) e.gs. tytx 4,2 2 ==
- 4. Parametric Equations Converting betweenCartesian and Parametric forms We use parametric equations because they are simpler, so we only convert to Cartesian if asked to do so ! e.g. 1 Change the following to a Cartesian equation and sketch its graph: tytx 4,2 2 == Solution: We need to eliminate the parameter t. We substitute for t from the easier equation: ⇒= ty 4 4 y t = Subst. in :2 2 tx = 2 4 2 =⇒ y x 8 2 y x =⇒
- 5. Parametric Equations The Cartesianequation is 8 2 y x = We usually write this as xy 82 = Either, we can sketch using a graphical calculator with xy 8±= and entering the graph in 2 parts. Or, we can notice that the equation is quadratic with x and y swapped over from the more usual form.
- 6. Parametric Equations The sketchis The curve is called a parabola. xy 82 = tytx 4,2 2 ==Also, the parametric equations show that as t increases, x increases faster than y.
- 7. Parametric Equations e.g. 2Change the following to a Cartesian equation: θθ sin3,cos3 == yx Solution: We need to eliminate the parameter θ. BUT θ appears in 2 forms: as and so, we need a link between these 2 forms. θcos θsin Which trig identity links and ?θcos θsin ANS: 1sincos 22 ≡+ θθ To eliminate θ we substitute into this expression.
- 8. Parametric Equations θcos 3 =⇒ x 9 sin 2 2 y =θ 9 cos 2 2x =⇒ θ θsin 3 = y 1sincos 22 ≡+ θθ 1 99 22 =+ yx 922 =+ yxMultiply by 9: becomes θθ sin3,cos3 == yxSo, N.B. = not ≡ We have a circle, centre (0, 0), radius 3.
- 9. Parametric Equations Since werecognise the circle in Cartesian form, it’s easy to sketch. However, if we couldn’t eliminate the parameter or didn’t recognise the curve having done it, we can sketch from the parametric form. If you are taking Edexcel you may want to skip this as you won’t be asked to do it. SKIP
- 10. Parametric Equations Solution: Let’s seehow to do it without eliminating the parameter. We can easily spot the min and max values of x and y: 22 ≤≤− x and 33 ≤≤− y ( It doesn’t matter that we don’t know which angle θ is measuring. ) For both and the min is −1 and the max is +1, so θcos θsin θθ sin3,cos2 == yx e.g. Sketch the curve with equations It’s also easy to get the other coordinate at each of these 4 key values e.g. 002 =⇒=⇒= yx θ
- 11. Parametric Equations ⇒== θθsin3,cos2 yx 22 ≤≤− x and 33 ≤≤− y We could draw up a table of values finding x and y for values of θ but this is usually very inefficient. Try to just pick out significant features. x x x 90=θ x 0=θ
- 12. Parametric Equations ⇒== θθsin3,cos2 yx 22 ≤≤− x and x 33 ≤≤− y This tells us what happens to x and y. 90 Think what happens to and as θ increases from 0 to . θcos θsin We could draw up a table of values finding x and y for values of θ but this is usually very inefficient. Try to just pick out significant features. x x x 90=θ x 0=θ
- 13. Parametric Equations ⇒== θθsin3,cos2 yx 22 ≤≤− x and x Symmetry now completes the diagram. 33 ≤≤− y This tells us what happens to x and y. 90 Think what happens to and as θ increases from 0 to . θcos θsin x x x 90=θ x 0=θ
- 14. Parametric Equations ⇒== θθsin3,cos2 yx 22 ≤≤− x and 33 ≤≤− y Symmetry now completes the diagram. x x x 90=θ x 0=θ
- 15. Parametric Equations ⇒== θθsin3,cos2 yx 22 ≤≤− x and 33 ≤≤− y Symmetry now completes the diagram. x x x 90=θ x 0=θ
- 16. Parametric Equations θθ sin3,cos2== yx So, we have the parametric equations of an ellipse ( which we met in Cartesian form in Transformations ). The origin is at the centre of the ellipse. x x x x Ox
- 17. Parametric Equations You canuse a graphical calculator to sketch curves given in parametric form. However, you will have to use the setup menu before you enter the equations. You will also have to be careful about the range of values of the parameter and of x and y. If you don’t get the right scales you may not see the whole graph or the graph can be distorted and, for example, a circle can look like an ellipse. By the time you’ve fiddled around it may have been better to sketch without the calculator!
- 18. Parametric Equations The followingequations give curves you need to recognise: θθ sin,cos ryrx == atyatx 2,2 == )(sin,cos babyax ≠== θθ a circle, radius r, centre the origin. a parabola, passing through the origin, with the x-axis as an axis of symmetry. an ellipse with centre at the origin, passing through the points (a, 0), (−a, 0), (0, b), (0, −b).
- 19. Parametric Equations To writethe ellipse in Cartesian form we use the same trig identity as we used for the circle. )(sin,cos babyax ≠== θθSo, for use 1sincos 22 ≡+ θθ 12 2 2 2 =+ b y a x ⇒ 1 22 = + b y a x ⇒ The equation is usually left in this form.
- 20. Parametric Equations There areother parametric equations you might be asked to convert to Cartesian equations. For example, those like the ones in the following exercise. Exercise θθ tan2,sec4 == yx t ytx 3 ,3 == ( Use a trig identity ) 1. 2. Sketch both curves using either parametric or Cartesian equations. ( Use a graphical calculator if you like ).
- 21. Parametric Equations Solution: θθ tan2,sec4== yx1. Use θθ 22 sectan1 ≡+ 22 42 1 = +⇒ xy 164 1 22 xy =+⇒ We usually write this in a form similar to the ellipse: 1 416 22 =− yx Notice the minus sign. The curve is a hyperbola.
- 22. Parametric Equations θθ tan2,sec4== yxSketch: 1 416 22 =− yx or A hyperbola Asymptotes
- 23. Parametric Equations t ytx 3 ,3 == (Eliminate t by substitution. ) 2. Solution: 3 3 x ttx =⇒= ⇒= t y 3 Subs. in x y 9 =⇒ 9=⇒ xy 3 3 x y = The curve is a rectangular hyperbola. x x 3 3 33 ×÷= =
- 24. Parametric Equations t ytx 3 ,3 ==9=xySketch: or A rectangular hyperbola. Asymptotes
- 25.
- 26. Parametric Equations The followingslides contain repeats of information on earlier slides, shown without colour, so that they can be printed and photocopied. For most purposes the slides can be printed as “Handouts” with up to 6 slides per sheet.
- 27. Parametric Equations θθ sin3,cos3== yx The Cartesian equation of a curve in a plane is an equation linking x and y. Some of these equations can be written in a way that is easier to differentiate by using 2 equations, one giving x and one giving y, both in terms of a 3rd variable, the parameter. Letters commonly used for parameters are s, t and θ. ( θ is often used if the parameter is an angle. ) e.gs. tytx 4,2 2 ==
- 28. Parametric Equations Converting betweenCartesian and Parametric forms We use parametric equations because they are simpler, so we only convert to Cartesian if asked to do so ! e.g. 1 Change the following to a Cartesian equation and sketch its graph: tytx 4,2 2 == Solution: We need to eliminate the parameter t. Substitution is the easiest way. ⇒= ty 4 4 y t = Subst. in :2 2 tx = 2 4 2 =⇒ y x 8 2 y x =⇒
- 29. Parametric Equations The Cartesianequation is 8 2 y x = We usually write this as xy 82 = Either, we can sketch using a graphical calculator with xy 8±= and entering the graph in 2 parts. Or, we can notice that the equation is quadratic with x and y swapped over from the more usual form.
- 30. Parametric Equations e.g. 2Change the following to a Cartesian equation: θθ sin3,cos3 == yx Solution: We need to eliminate the parameter θ. BUT θ appears in 2 forms: as and so, we need a link between these 2 forms. θcos θsin To eliminate θ we substitute into the expression. 1sincos 22 ≡+ θθ
- 31. Parametric Equations θcos 3 =⇒ x 9 sin 2 2 y =θ 9 cos 2 2x =⇒ θ θsin 3 = y 1sincos 22 ≡+ θθ 1 99 22 =+ yx 922 =+ yxMultiply by 9: becomes θθ sin3,cos3 == yxSo, N.B. = not ≡ We have a circle, centre (0, 0), radius 3.
- 32. Parametric Equations The followingequations give curves you need to recognise: θθ sin,cos ryrx == atyatx 2,2 == )(sin,cos babyax ≠== θθ a circle, radius r, centre the origin. a parabola, passing through the origin, with the x-axis an axis of symmetry. an ellipse with centre at the origin, passing through the points (a, 0), (−a, 0), (0, b), (0, −b).