How do you find the area of one petal of #r=6sin2theta#?

2 Answers
Jan 31, 2017

#(9pi)/2 #

Explanation:

Area in polar coordinates is given by:

# A = int_alpha^beta 1/2 r^2 \ d theta #

The first step is to plot the polar curve to establish the appropriate range of #theta#

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From the graph we can see that for the petal in Q1 then #theta in [0, pi/2]#

Hence,

# A = int_0^(pi/2) 1/2 (6sin2theta)^2 \ d theta #
# \ \ \ = 18 \ int_0^(pi/2) sin^2 2theta \ d theta #
# \ \ \ = 18 \ int_0^(pi/2) 1/2(1-cos 4 theta) \ d theta #
# \ \ \ = 9 \ int_0^(pi/2) 1-cos 4 theta \ d theta #
# \ \ \ = 9 \ [ theta -1/4sin 4 theta ]_0^(pi/2) #
# \ \ \ = 9 \ {(pi/2-1/4sin(2pi)) - (0)} #
# \ \ \ = (9pi)/2 #

Jan 31, 2017

#9/2pi# areal units.

Explanation:

#r=sqrt(x^2+y^2)=6sin2theta >= 0#.

So, #2theta in Q_1 or Q_2#, giving #theta in Q_1#

The period of #sin 2theta# is #(2pi)/2=pi#

So, there are #(2pi)/pi=2# petals, for #theta in [0. 2pi]

The ares in one petal ( start at #theta = 0# and end at #theta =pi/2#

#=1/2 int r^2 d theta#, with# r = 6sin2theta and theta# from #0 to pi/2#

#=18 int sin^2(2theta) d theta#, for the limits

#=9 int (1-cos4theta) d theta#, for the limits

#=9[theta-1/4sin4theta]#, between 0 and # pi/2#.

#=9/2pi#

graph{(x^2+y^2)^1.5-12xy=0 [-10, 10, -5, 5]}