Converting between Cartesian and Polar Functions
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Transcript of Converting between Cartesian and Polar Functions
Converting between Cartesian and Polar FunctionsElmer NoconAngelo BernabeMark Kenneth Hitosis
cos
sin
tan
222
rx
ryx
y
ryx1035 xy we substitute r ∙ sin Θ for y103)sin(5 xr
then substitute r ∙ cos Θ for x10)cos(3)sin(5 rr
we factor out r 10)cos3sin5( r
)cos3sin5(
10
)cos3sin5(
)cos3sin5(
r
divide both sides of the equation by (5sin Θ – 3cos Θ)
)cos3sin5(
10
rF I N
A
LANSWE
R
cos
sin
tan
222
rx
ryx
y
ryx96 xy we substitute r ∙ sin Θ for yand r ∙ cos Θ for x respectively9cos6sin rr
subtract (6 r ∙ cos Θ) from both sides of the equation , which will result into this 9cos6sin rrfactor out r9)cos6(sin r
divide (sin Θ - 6cos Θ) from both sides of the equation
)cos6(sin
9
r
F I N A
LANSWE
R
sin7r
cos
sin
tan
222
rx
ryx
y
ryxfrom y = r ∙ sin Θ we convert it to another equation by dividing from both sides of the equation r sin
r
y
r
yr7
then we substitute y/r for sin Θ
cross multiplyyr 72
then we substitute x2 + y2 for r2 yyx 722 F I N
A
LANSWE
R
cossinr
cos
sin
tan
222
rx
ryx
y
ryxfrom y = r ∙ sin Θ we convert it to another equation by dividing from both sides of the equation r sin
r
y
from x = r ∙ cos Θ we convert it to another equation by dividing from both sides of the equation r cos
r
x
then we substitute y/r for sin Θ and x/r for cos Θ respectivelyr
x
r
yr
Then multiply both sides of the equation by rxyr 2 then we substitute x2 + y2 for r2
xyyx 22
F I N A
LANSWE
R
2cr
cos
sin
tan
222
rx
ryx
y
ryx
let’s say that c represents some constant
222 )()( cr then we substitute x2 + y2 for r2 422 cyx
F I N A
LANSWE
R
square both sides of the equation
42 cr