Casio Reckon Podręcznik użytkownika - Strona 7
Przeglądaj online lub pobierz pdf Podręcznik użytkownika dla Kalkulator Casio Reckon. Casio Reckon 14 stron. Graphing calculator
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Matrices
Reckon interprets vectors that look like matrices as matrices. The vector [1 2 3] is considered as a row, for
example, it legal to multiply this row by a 3xN matrix. For matrix multiplication of A*B, the number of
columns of A must match the number of rows of B.
The column vector of 1,2,3 looks like this: [[1][2][3]] and is very different. You can generate this column by
transposing the vector T([1 2 3]). For RPN transpose is mapped to SHIFT ARROW
Note that currently you must separate elements of vectors or matrices by commas during the input
process.
Currently, if Reckon does not see your input as a valid matrix it will treat it as a generic vector. This might
cause confusion. For example the 1x1 matrix of 0 is the vector [0], consequently [[0]] is not recognised as
this object and will not operate arithmetically.
Once an object is recognised as a matrix, Reckon tries to treat it arithmetically as far as possible, If you add
or multiply a vector or matrix by a scalar, the effect will be to apply that operation on each element of the
vector. e.g. [[1 2][3 4]] + 1 is [[2 3][4 5]].
If you add vectors, corresponding elements will be added. eg [1 2 3] + [4 5 6] is [5 7 9]. The same applies
to matrices, eg [[1 2][3 4]] + [[4 5][6 7]] is [[5 7][9 11]].
Multiplication of matrices works according to the usual rules:
[[1 2][3 4]] * [[4 5][6 7]] is
[[16 19]
[36 43]]
Reckon tries to offer division of matrices by defining A/B as B
matrix B and multiplies it in order to give the illusion of division
for example [[1 2][3 4]]/[[4 5][6 7]] is
[[4 3]
[-3 -2]]
Other matrix operations including the determinant which is given by Abs(), and transpose which is T().
The Proot() function finds the roots of a polynomial with real coefficients. For example,
Proot takes a vector of coefficients where element i is the coefficient of z
the input vector.
eg.
> proot([-500,370,170,-425,225,-45,5])
[3-4i 3+4i 1-1i 1+1i 2 -1]
1
Matrices form a ring and not a field, proper division does not really exist!
Plank constant
Electron Charge
Avagadro Number
Gas constant
Mechanical horsepower
5
− 45
+ 225
6
5
4
-1
*A. i.e., Reckon calculates the inverse of the
1
.
− 425
+ 170
+ 370 − 500
3
2
Js
C
-1
mol
J/K/mol
W
i
. Note the order of coefficients in