7. Using another polar coordinate grid, graph the function r(θ) = 4 + 2sinθ. What difference(s) do you notice between this graph and the one in the previous problem? How could we anticipate these differences just by looking at the formula for each function? The second picture being the previous problem it was talking about 6. Shown below is the graph of the function r(0) = 2 + 4cos0 in rectangularCoordinates0r(0.6)1161131122506706413302503(2x, 6)11160211 7. Using another polar coordinate grid, graph the function r(0) = 4+2sine. Whatdifference(s) do you notice between this graph and the one in the previousproblem? How could we anticipate these differences just by looking at the formulafor each function?120° 105 90°195° 180°165° 150012 s22 .00213575°60°45°3 4 500E STE15°345°3300=0°

Using another polar coordinate grid, graph the function r(θ) = 4 + 2sinθ. What difference(s) do you notice between this graph and the one in the previous problem? How could we anticipate these differences just by looking at the formula for each function?

Using another polar coordinate grid, graph the function r(θ) = 4 + 2sinθ. What difference(s) do you notice between this graph and the one in the previous problem? How could we anticipate these differences just by looking at the formula for each function?

Algebra and Trigonometry (MindTap Course List)

4th Edition

ISBN:9781305071742

Author:James Stewart, Lothar Redlin, Saleem Watson

Publisher:James Stewart, Lothar Redlin, Saleem Watson

Chapter8: Polar Coordinates And Parametric Equations

Section8.FOM: Focus On Modeling: The Path Of A Projectile

Problem 7P: Shooting into the Wind Using the parametric equations you derived in Problem 6. draw graphs of the...

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Question

7. Using another polar coordinate grid, graph the function r(θ) = 4 + 2sinθ. What difference(s) do you notice between this graph and the one in the previous problem? How could we anticipate these differences just by looking at the formula for each function? The second picture being the previous problem it was talking about

6. Shown below is the graph of the function r(0) = 2 + 4cos0 in rectangular
Coordinates
0
r
(0.6)
116
113
112
2
506
706
413
302
503
(2x, 6)
1116
0
211

7. Using another polar coordinate grid, graph the function r(0) = 4+2sine. What
difference(s) do you notice between this graph and the one in the previous
problem? How could we anticipate these differences just by looking at the formula
for each function?
120° 105 90°
195° 180°
165° 150
012 s22 .002
135
75°
60°
45°
3 4 5
00E STE
15°
345°
330
0=0°

Expression, rule, or law that gives the relationship between an independent variable and dependent variable. Some important types of functions are injective function, surjective function, polynomial function, and inverse function.

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