Isiqondiso kumsebenzisi
Table Of Contents
- Okuqukethwe
- Ngaphambi Kokusebenzisa Umshini Wokubala
- Izindlela Zokusebenza Zomshini Wokubala Kanye Nokuhlelwa Komshini Wokubala
- Ukubala Okuyisisekelo
- Ukufaka Izimpawu Zezibalo Nama Nani
- Izibalo Ze-Arithmetic
- Izibalo Ezingamaqhezu
- Izibalo Zamaphesenti
- Izinga, Umzuzu, Umzuzwana (Sexagesimal)
- Izitatimende Ezikaningi (fx-82MS/fx-85MS/fx-300MS/fx-350MS kuphela)
- Ukusebenzisa Ukwaziswa Wezobunjiniyela
- Umlando Wezibalo Nokuphinde Uveze
- Ukusebenzisa Ukubenza Kwesigcina-lwazi
- Izibalo Ngokusebenzisa I-function
- Pi (π), Natural Logarithm Base e (Umsuka Wokubala We-Logarithm Yemvelo e)
- Imisebenzi Ye-Trigonometric, Imisebenzi Ye-Inverse Trigonometric
- Imisebenzi Ye-Hyperbolic, Imisebenzi Ye-Inverse Hyperbolic
- Engele Ukuguqulwa Kweyunithi
- Imisebenzi Ye-Exponential, Imisebenzi Ye-Logarithmic
- Ukusebenza Kwamandla Nokusebenza Komsuka Wamandla
- Ukuguqulwa Kwesanxande - Polar Coordinate
- I-factorial (!)
- Inombolo Engahleliwe (Ran#)
- I-inteksi Ehleliwe (RanInt#) (fx-220 PLUS kuphela)
- Uhlelo (nPr) Nokuhlanganiswa (nCr)
- Ukuyisa Inombolo Engaziwa Kwinombolo Ephelele Eseduze (Rnd)
- Ukusebenzisa Indlela Yokubala
- Ulwazi Lwezobuchwepheshe
Ukuhlobana Kwezinombolo Eziphindaphindayo r = 0.982607368
(S-VAR) (r) 0.982607368
Ukucindezela Komoya ku-5°C = 994.6
5 (S-VAR) ( yˆ)
994.6
Ukushisa ku-1000 hPa = 4.642857143
1000 (S-VAR) ( xˆ)
4.642857143
Inombolo Eziphindaphindayo Zokuqiniseka = 0.965517241
(S-VAR) (r) 0.965517241
Isibonelo Se-Covariance = 35
(S-SUM) (Σxy)
(S-SUM) ( n )
(S-VAR) ( x
-
)
(S-VAR) ( y
-
)
(S-SUM) ( n ) 1
35.
I-Logarithmic, Ama-Exponenti, Izinombolo eziziphindaphindayo
ngazo siqu, nanezinombolo ezishintshayo zohlobo lwe invesi
• Sebenzisa imisebenzi efanayo echofozekayo neyezInombolo
ezishintshayo ukubuyisa imiphumela yalezi zinhlobo zezInombolo
ezishintshayo.
• Lokhu okulandelayo kubonisa amafomula ezinombolo ezishintshayo
ngohlobo ngalunye.
Izinombolo Ezishintshayo
Ze-Logarithmic
y = A + B・ln x
Izinombolo Ezishintshayo
Eziziphindaphindayo
y = A・ e
B• x
(ln y = ln A + B x )
Izinombolo Ezishintshayo
Eziziphindayo
y = A・ x
B
(ln y = ln A + Bln x )
Izinombolo Ezishintshayo
Zohlobo Lwe-invesi
y = A + B・1/ x
42