LESSON 79 – EXPONENTIAL FORMS OF COMPLEX NUMBERS HL2 Math - Santowski.

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LESSON 79 – EXPONENTIAL FORMS OF COMPLEX NUMBERS HL2 Math - Santowski

Opening Exercise #1  List the first 8 terms of the Taylor series for (i) e x, (ii) sin(x) and (iii) cos(x)  HENCE, write the first 8 terms for the Taylor series for e θ  HENCE, write the first 8 terms for the Taylor series for e i θ. Simply your expression.  What do you notice?

Opening Exercise #2  If y( θ ) = cos( θ ) + i sin( θ ), determine dy/d θ  Simplify your expression and what do you notice?

EXPONENTIAL FORM or Which function does this?

EXPONENTIAL FORM So (not proof but good enough!) If you find this incredible or bizarre, it means you are paying attention. Substituting gives “Euler’s jewel”: which connects, simply, the 5 most important numbers in mathematics.

Forms of Complex Numbers

Conversion Examples  Convert the following complex numbers to all 3 forms:

Example #1 - Solution

Example #2 - Solution

Further Practice

Further Practice - Answers

Example 5

Example 5 - Solutions

Verifying Rules …..  If  Use the exponential form of complex numbers to determine:

Example 6

Example 6 - Solutions

And as for powers …..  Use your knowledge of exponent laws to simplify:

And as for powers …..  Use your knowledge of exponent laws to simplify:

So.. Thus …..

And de Moivres Theorem …..  Use the exponential form to:

de Moivres Theorem

Famous Equations …..  Show that

Challenge Q  Show that