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Find the area of the region inside the larger loop and outside the smaller loop of the polar curve
help please 5. Evaluate the area of the shaded region (inside the larger circle and outside the smaller one) by using the double integral in polar coordinates Hint: Treat the right and left parts of the region separately:) 5. Evaluate the area of the shaded region (inside the larger circle and outside the smaller one) by using the double integral in polar coordinates Hint: Treat the right and left parts of the region separately:)
Find the area of the region that lies inside the first curve and outside the second curve. r = 3 - 3 sin(θ), r = 3 Find the exact length of the curve. Use a graph to determine the parameter interval. r = cos2(θ/2)
Find the area of the region inside: but outside: ******************************************************* Find the area of the region outside , but inside .
Find the area of the region that lies inside the first curve and outside the second curve. r2=72 cos(28), r=6
4. Consider the area of the region that lies inside the curve given in polar form) by r = 6 sin(@) and outside the cardioid given by r=2+2 sin(0). (a) (3pts) Set up but do not evaluate an integral(s) which represents the area of this region. (b) (3.5pts) Evaluate this integral to determine the exact area of this region. (Hint: you will need to use a trig, identity)
Find the area of the region inside: r= 8sinθr but outside: r = 2
Find the area outside the curve r = 2 and inside the curve r= 4 sino For the toolbar, press ALT.10 (RC)
Find the area of the region inside the cardioid r= 4-4sintheta and outside the the circle r=6.