Calculator Tips

From PrattWiki
Revision as of 19:33, 20 March 2022 by DukeEgr93 (talk | contribs) (Euler)
Jump to navigation Jump to search

This page contains information about how to use various calculators for different classes. Starting in Spring of 2020, the recommended calculator for Dr. G's sections of Fundamentals of ECE (ECE 110) and Electrical Fundamentals of Mechatronics (EGR 224) is the Casio fx-991EX "CLASSWIZ"; the user's manual is available from Casio. The CLASSWIZ can work with comlpex numbers as long as you set the mode correctly. Also, the TI 83 plus, 84 plus, and 89 are all capable of dealing with complex numbers, but in different ways. Below, "83" means 83 plus and "84" means 84 plus.

CLASSWIZ

Complex mode

For the CLASSWIZ to work with complex values, it needs to be in complex mode:

  • Turn the calculator on
  • Hit the Menu button
  • Hit 2 for complex

To test this, try calculating the square root of negative 1. If you get a math error, you are in the wrong mode.

Other settings

  • For input and output representations - you will most likely want to set the calculator to Math Input and Decimal Output. See p. 5 of the user's guide.
    • Hit Shift and then Menu/Setup
    • Hit 1 for Input/Output
    • Hit 2 for MathI / Decimal0
This will automatically convert items to floating point rather than leaving raw square roots, $$\pi$$, and the like. If you want to convert back and forth quickly, use the $$S\leftrightarrow D$$ button.
  • For angles:
    • Hit shift and then Menu/Setup
    • Hit 2 for Angle Unit
    • Pick the unit you will generally be using - most likely degrees- all input and output will use these units for angles.
      • If you want to specify a different input unit during a calculation, enter the number then Option-Up-2 and choose the unit. If your calculator is in radian mode, for instance $$1\angle 45$$ will give you the result for 1 at 45 radians while $$a\angle 45^o$$ will give you the results for 45 degrees(even in radians mode).
  • To display values in a particular way:
    • Hit Shift and then Menu/Setup
    • Hit 3 for Number Format
    • Sci (2) and then 5 tends to be a pretty useful way to go.
  • To set the complex number display to the way you like it:
    • Hit Shift and then Menu/Setup
    • Scroll down one page and then type 2 for Complex
    • Choose either rectangular or polar coordinates


Entering Values

Cartesian

Enter the real part, followed by the sign of the imaginary part, followed by $$i$$ or $$x~i$$. Note that if the real part is negative, or if the real part is 0 and the imaginary part is negative, you need to use the unary (-) versus the binary -.

Polar

Enter the magnitude, followed by the angle symbol (SHIFT ENG), followed by the angle in the appropriate units for how your calculator is set. Note that the magnitude must be non-negative! If you have a negative magnitude for a number by itself (for instance, $$-2\angle 30^o$$, you either need to enter it as 0- that number ($$0-2\angle 30^o$$) or you need to change the angle by $$\pm180^o$$ ($$2\angle -150$$)

Displaying Values

  • To show your previous answer in polar notation:
    • OPTN
    • Down
    • 1
    • =
  • To show your previous answer in rectangular notation:
    • OPTN
    • Down
    • 2
    • =

Complications

  • The CLASSWIZ will not accept complex numbers in polar form with negative magnitudes. You can subtract a number from another, but you can not have the unary negative in front of a magnitude.
  • The CLASSWIZ will not do roots of complex numbers.


TI 83+, 84+, 89

  • To use complex numbers on a TI-89, you need to set the right mode. Hit the MODE button and set the following:
    • Angle: 2: Degree
    • Complex Format: 3: Polar
  • The 83, 84, and 89 all have the \(i\). For 83/84 it is "<2ND> ." (that is, the 2nd function button at top left followed by the decimal point in the bottom row) and for the 89 it is "<2ND> <CATALOG>"; entering a complex number in Cartesian form is thus as simple as multiplying the imaginary part by \(i\).

Euler

  • The 83, 84, and 89 all allow for complex exponentials. Note, however, that the exponent must be in radians, regardless of the mode of the calculator! The Euler form of \(10\angle 60^o\) would thus be \(e^{(\pi/6)}\).
    • For the 83, if you are in degree mode, the results will be in degree mode but the inputs must always be in radians. For instance,
e^(i*90)

returns

1e^(116.62i)

if the calculator is in degree mode since 90 radians simplifies to 116.62 degrees. It returns

1e^(2.035i)

if the calculator is in radian mode since 90 radians is the same as 90-28\(\pi\) is 2.035 radians.

    • For the 84, the results are the same as for the 83 however you must be very careful if you try to use the result from a complex calculation that is reported in degree mode. On an 84, if you enter
e^(i*90)

the result, in degree mode, is

1e^(116.62i)

If you try to up-arrow to that result and hit <ENTER> to copy it, then use it, the 84 will think of the 116.62 as a value in radians - which is to say, not at all what you meant! If you are in degree mode, you need to refrain from using the Euler representation on an 84 or at least understand that intermediate results in Euler mode and degree mode together cannot be used later.

    • For the 84, the calculator will not let you use Euler representation if you are in degree mode - you will get a domain error. To use Euler representations on an 84, you will have to be in radian mode.

Polar

  • Neither the 83 nor the 84 use polar representation. You have to use Euler if you have a magnitude and an angle, and the angle must be entered in radians.
  • The 89 has an angle button; to enter a complex number in polar notation, surround it with parentheses and separate the magnitude from the angle with the angle button, obtained with <2ND> <EE>. Note that the number you put in for an angle is based on the mode the calculator is in, so if you are in degree mode,
(1<60)

will be the same as

0.5+0.8660i

Displaying Values

For the TI-89:

  • To show your previous answer in polar notation:
    • 2nd -(ANS) 2nd 5(MATH) 4(Complex) up(to Vector Ops) right(into menu) 4(->Polar) Enter, or
    • 2nd -(ANS) 2nd MODE(->) ALPHA ALPHA STO(P) -(O) 4(L) =(A) 2(R) ENTER ALPHA
  • To show your previous answer in rectangular notation:
    • 2nd -(ANS) 2nd 5(MATH) 4(Complex) up(to Vector Ops) right(into menu) 5(->Rect) Enter, or
    • 2nd -(ANS) 2nd MODE(->) ALPHA ALPHA 2(R) /(E) )(C) T ENTER ALPHA

Storing Values

If you are asked to perform complex calculations, you may want to store element values so that you can simply type a letter versus entering a number every time you use those values. For example, if a problem asks you to calculate the value of:

\( \begin{align} \Bbb{H}(j\omega)=\frac{j\omega L}{j\omega L + R}\\ L=1\mbox{mH}, R=5\mbox{k}\Omega \end{align} \)

for a few different values of \(\omega\) (say, $$10$$ rad/s and $$10^6$$ rad/s), you could do the following on your calculator:

CLASSWIZ

The CLASSWIZ only has the letters A, B, C, D, E, F, x, y, and M to store, so you have to choose where to store things. For this example, we will store the inductor value in A and the resistor value in B. Also note that once you hit the STO key, you will not need to hit the ALPHA button to indicate the letter. In the keystrokes below then, the A really means hitting the (-) key and the B means hitting the...one next to it...

1 <x10x> (-) 3 <STO> A
5 <x10x> 3 <STO> B

We will store the frequency component in x:

10 * i <STO> x

to store the values. Then, to calculate the first value,

( <ALPHA> x * <ALPHA> A ) / ( <ALPHA> x * <ALPHA> A + <ALPHA> B )

and you should get $$2.0000x10^{-6}\angle 9.0000x10^1$$ Once you get the result, if you want to calculate the value for a different frequency (say, $$10^6$$), simply type

1 <x10x> 6 * <2ND> i <STO> x

then use the arrow buttons to go back up to where you performed the previous symbolic calculation, and hit the = key to recalculate. You will now get $$1.9612x10^{-1}\angle 8.8690x10^1$$.


TI

1e-3 <STO>> <ALPHA> l
5e3 <STO>> <ALPHA> r

To store the frequency component, on TI 83/84 plus, you will need to use ALPHA z, while on the TI 89 you can just use the z button:

10 * 2ND i STO> (ALPHA) z

to store the values. Then, to calculate the first value,

( <ALPHA> z * <ALPHA> l ) / ( <ALPHA> z * <ALPHA> l + <ALPHA> r )

Once you get the result, if you want to calculate the value for a different frequency, simply type

1e6 * <2ND> i <STO>> <ALPHA> z

then use the arrow buttons to go back up to where you performed the previous symbolic calculation, ENTER it to duplicate it, then ENTER it again to calculate.

Constant of Angle Conversion

If you are doing several complex calculations on an 83/84 and the angles you are given are in degrees, you may want to store a constant for the conversion to radians so you do not have to type in "* pi / 180" every time. You could just put in

pi / 180 <STO>> X

and then when you need to write a complex number in Euler form, you could multiply the angle in degrees by X; for instance, to get 6<30 degrees, you could write

6*e^(i*30*X)

You can choose any letter, obviously, but X is easy to get from the \(X,T,\Theta,n\) button on the 83/84.

Statics Functions

TI-83/84

Not as many built-in functions for vectors / matrices. See http://www.tc3.edu/instruct/sbrown/ti83/vecprod.htm for a program that will help with cross products.

TI-89

Vectors in General

Vectors may be entered surrounded by [ ]. That is, for some vector \(\vec{r}\):

\( \begin{align} \vec{r}&=r_x\hat{\imath}+r_y\hat{\jmath}+r_z\hat{k} \end{align} \)

say,

\( \begin{align} \vec{r}&=3\hat{\imath}-2\hat{\jmath}+6\hat{k} \end{align} \)

the TI version of the vector would be:

[3, -2, 6]

Note that the result will actually be surrounded by two sets of square brackets, representing a matrix. Be sure to use the unary negative operator (-) versus the binary subtraction operator - at the start of negative entries.

Dot and Cross Products

Unit Directions

  • To find the unit direction for a vector, use
    • <2nd>--<5>MATH--<4>Matrix--L:Vector ops--<1>unitV()

Coordinate Angles

  • To find the coordinate angles of a vector, you should first get the unit direction vector. Then, you must turn the unit direction vector into a list before taking the arccos of the list. Lists are surrounded by {} instead of []. To convert a vector to a list, use
    • <2nd>--<5>MATH--<3>List--F:mat->list()
      and put the desired matrix in as the argument; the result will be surrounded by {}. You can then apply the arccos to the list and get all three coordinate direction angles at once!

Questions

Post your questions by editing the discussion page of this article. Edit the page, then scroll to the bottom and add a question by putting in the characters *{{Q}}, followed by your question and finally your signature (with four tildes, i.e. ~~~~). Using the {{Q}} will automatically put the page in the category of pages with questions - other editors hoping to help out can then go to that category page to see where the questions are. See the page for Template:Q for details and examples.

External Links

References