find the argument of Z where Z is equal to minus 1 + root 3i
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Answer:
what is 3 i ............
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Answer:How to calculate the argument of a complex number?
Answer:How to calculate the argument of a complex number?The argument is an angle
Answer:How to calculate the argument of a complex number?The argument is an angle θ
Answer:How to calculate the argument of a complex number?The argument is an angle θ qualifying the complex number
Answer:How to calculate the argument of a complex number?The argument is an angle θ qualifying the complex number z
Answer:How to calculate the argument of a complex number?The argument is an angle θ qualifying the complex number z in the complex plane:
Answer:How to calculate the argument of a complex number?The argument is an angle θ qualifying the complex number z in the complex plane:arg(z)=2arctan(I(z)R(z)+|z|)=θ mod2π with R(z) the real part and I(z) the imaginary part of z.
Answer:How to calculate the argument of a complex number?The argument is an angle θ qualifying the complex number z in the complex plane:arg(z)=2arctan(I(z)R(z)+|z|)=θ mod2π with R(z) the real part and I(z) the imaginary part of z.Example: Take
Answer:How to calculate the argument of a complex number?The argument is an angle θ qualifying the complex number z in the complex plane:arg(z)=2arctan(I(z)R(z)+|z|)=θ mod2π with R(z) the real part and I(z) the imaginary part of z.Example: Take z=1+i,
Answer:How to calculate the argument of a complex number?The argument is an angle θ qualifying the complex number z in the complex plane:arg(z)=2arctan(I(z)R(z)+|z|)=θ mod2π with R(z) the real part and I(z) the imaginary part of z.Example: Take z=1+i, the real part is 1,
Answer:How to calculate the argument of a complex number?The argument is an angle θ qualifying the complex number z in the complex plane:arg(z)=2arctan(I(z)R(z)+|z|)=θ mod2π with R(z) the real part and I(z) the imaginary part of z.Example: Take z=1+i, the real part is 1, the imaginary part is 1
Answer:How to calculate the argument of a complex number?The argument is an angle θ qualifying the complex number z in the complex plane:arg(z)=2arctan(I(z)R(z)+|z|)=θ mod2π with R(z) the real part and I(z) the imaginary part of z.Example: Take z=1+i, the real part is 1, the imaginary part is 1 and the modulus of the complex number
Answer:How to calculate the argument of a complex number?The argument is an angle θ qualifying the complex number z in the complex plane:arg(z)=2arctan(I(z)R(z)+|z|)=θ mod2π with R(z) the real part and I(z) the imaginary part of z.Example: Take z=1+i, the real part is 1, the imaginary part is 1 and the modulus of the complex number |z| equals √(2), so
Answer:How to calculate the argument of a complex number?The argument is an angle θ qualifying the complex number z in the complex plane:arg(z)=2arctan(I(z)R(z)+|z|)=θ mod2π with R(z) the real part and I(z) the imaginary part of z.Example: Take z=1+i, the real part is 1, the imaginary part is 1 and the modulus of the complex number |z| equals √(2), so arg(z)=2 arctan(1/(1+√(2)))=π/4
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