![](data:image/png;base64,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)
–8–
#028
(3E-4E)E=
#029 (X, Y) = ('2, '2) → (r,
θ
)
1+(Pol)!2e
Math
1)(,)!2e)=
1+(Pol)!2)
1)(,)!2))=
#030 (r,
θ
) = (2, 30) → (X, Y)
1-(Rec)21)(,)
30)=
#031
(5+3)1E(
x!)=
#032
D2-7=
Math
D2-7)=
LINE
Deg
MATH
LINE
LINE
Deg
LINE
1
= 12
1
3
1
4
–
LINE
MATH