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Collatz Tesseracts w/ circles
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Uttryck 75: "y" equals ( ( 2 / "n" plus 1 ) minus ( 3 "n" ) )
y
=
(
(
2
/
n
+
1
)
−
(
3
n
)
)
75
Uttryck 76:
76
Uttryck 77: "y" equals ( ( 3 "n" minus 1 ) / ( 2 "n" ) )
y
=
(
(
3
n
−
1
)
/
(
2
n
)
)
77
Uttryck 78: "y" equals ( ( 3 "n" minus 1 ) * ( 2 "n" ) )
y
=
(
(
3
n
−
1
)
*
(
2
n
)
)
78
Uttryck 79: "y" equals ( ( 3 "n" minus 1 ) plus ( 2 "n" ) )
y
=
(
(
3
n
−
1
)
+
(
2
n
)
)
79
Uttryck 80: "y" equals ( ( 3 "n" minus 1 ) minus ( 2 "n" ) )
y
=
(
(
3
n
−
1
)
−
(
2
n
)
)
80
Uttryck 81:
81
Uttryck 82: "y" equals ( ( 2 / "n" ) * ( 3 "n" minus 1 ) )
y
=
(
(
2
/
n
)
*
(
3
n
−
1
)
)
82
Uttryck 83: "y" equals ( ( 2 / "n" ) / ( 3 "n" minus 1 ) )
y
=
(
(
2
/
n
)
/
(
3
n
−
1
)
)
83
Uttryck 84: "y" equals ( ( 2 / "n" ) plus ( 3 "n" minus 1 ) )
y
=
(
(
2
/
n
)
+
(
3
n
−
1
)
)
84
Uttryck 85: "y" equals ( ( 2 / "n" ) minus ( 3 "n" minus 1 ) )
y
=
(
(
2
/
n
)
−
(
3
n
−
1
)
)
85
Uttryck 86:
86
Uttryck 87: "y" equals ( ( 2 / "n" minus 1 ) * ( 3 "n" ) )
y
=
(
(
2
/
n
−
1
)
*
(
3
n
)
)
87
Uttryck 88: "y" equals ( ( 2 / "n" minus 1 ) / ( 3 "n" ) )
y
=
(
(
2
/
n
−
1
)
/
(
3
n
)
)
88
Uttryck 89: "y" equals ( ( 2 / "n" minus 1 ) plus ( 3 "n" ) )
y
=
(
(
2
/
n
−
1
)
+
(
3
n
)
)
89
Uttryck 90: "y" equals ( ( 2 / "n" minus 1 ) minus ( 3 "n" ) )
y
=
(
(
2
/
n
−
1
)
−
(
3
n
)
)
90
Uttryck 91:
91
Uttryck 92: negative "y" equals ( ( 3 "n" plus 1 ) / ( 2 "n" ) )
−
y
=
(
(
3
n
+
1
)
/
(
2
n
)
)
92
Uttryck 93: negative "y" equals ( ( 3 "n" plus 1 ) * ( 2 "n" ) )
−
y
=
(
(
3
n
+
1
)
*
(
2
n
)
)
93
Uttryck 94: negative "y" equals ( ( 3 "n" plus 1 ) plus ( 2 "n" ) )
−
y
=
(
(
3
n
+
1
)
+
(
2
n
)
)
94
Uttryck 95: negative "y" equals ( ( 3 "n" plus 1 ) minus ( 2 "n" ) )
−
y
=
(
(
3
n
+
1
)
−
(
2
n
)
)
95
Uttryck 96:
96
Uttryck 97: negative "y" equals ( ( 2 / "n" ) * ( 3 "n" plus 1 ) )
−
y
=
(
(
2
/
n
)
*
(
3
n
+
1
)
)
97
Uttryck 98: negative "y" equals ( ( 2 / "n" ) / ( 3 "n" plus 1 ) )
−
y
=
(
(
2
/
n
)
/
(
3
n
+
1
)
)
98
Uttryck 99: negative "y" equals ( ( 2 / "n" ) plus ( 3 "n" plus 1 ) )
−
y
=
(
(
2
/
n
)
+
(
3
n
+
1
)
)
99
Uttryck 100: negative "y" equals ( ( 2 / "n" ) minus ( 3 "n" plus 1 ) )
−
y
=
(
(
2
/
n
)
−
(
3
n
+
1
)
)
100
Uttryck 101:
101
Uttryck 102: negative "y" equals ( ( 2 / "n" plus 1 ) * ( 3 "n" ) )
−
y
=
(
(
2
/
n
+
1
)
*
(
3
n
)
)
102
Uttryck 103: negative "y" equals ( ( 2 / "n" plus 1 ) / ( 3 "n" ) )
−
y
=
(
(
2
/
n
+
1
)
/
(
3
n
)
)
103
Uttryck 104: negative "y" equals ( ( 2 / "n" plus 1 ) plus ( 3 "n" ) )
−
y
=
(
(
2
/
n
+
1
)
+
(
3
n
)
)
104
Uttryck 105: negative "y" equals ( ( 2 / "n" plus 1 ) minus ( 3 "n" ) )
−
y
=
(
(
2
/
n
+
1
)
−
(
3
n
)
)
105
Uttryck 106:
106
Uttryck 107: negative "y" equals ( ( 3 "n" minus 1 ) / ( 2 "n" ) )
−
y
=
(
(
3
n
−
1
)
/
(
2
n
)
)
107
Uttryck 108: negative "y" equals ( ( 3 "n" minus 1 ) * ( 2 "n" ) )
−
y
=
(
(
3
n
−
1
)
*
(
2
n
)
)
108
Uttryck 109: negative "y" equals ( ( 3 "n" minus 1 ) plus ( 2 "n" ) )
−
y
=
(
(
3
n
−
1
)
+
(
2
n
)
)
109
Uttryck 110: negative "y" equals ( ( 3 "n" minus 1 ) minus ( 2 "n" ) )
−
y
=
(
(
3
n
−
1
)
−
(
2
n
)
)
110
Uttryck 111:
111
Uttryck 112: negative "y" equals ( ( 2 / "n" ) * ( 3 "n" minus 1 ) )
−
y
=
(
(
2
/
n
)
*
(
3
n
−
1
)
)
112
Uttryck 113: negative "y" equals ( ( 2 / "n" ) / ( 3 "n" minus 1 ) )
−
y
=
(
(
2
/
n
)
/
(
3
n
−
1
)
)
113
Uttryck 114: negative "y" equals ( ( 2 / "n" ) plus ( 3 "n" minus 1 ) )
−
y
=
(
(
2
/
n
)
+
(
3
n
−
1
)
)
114
Uttryck 115: negative "y" equals ( ( 2 / "n" ) minus ( 3 "n" minus 1 ) )
−
y
=
(
(
2
/
n
)
−
(
3
n
−
1
)
)
115
Uttryck 116:
116
Uttryck 117: negative "y" equals ( ( 2 / "n" minus 1 ) * ( 3 "n" ) )
−
y
=
(
(
2
/
n
−
1
)
*
(
3
n
)
)
117
Uttryck 118: negative "y" equals ( ( 2 / "n" minus 1 ) / ( 3 "n" ) )
−
y
=
(
(
2
/
n
−
1
)
/
(
3
n
)
)
118
Uttryck 119: negative "y" equals ( ( 2 / "n" minus 1 ) plus ( 3 "n" ) )
−
y
=
(
(
2
/
n
−
1
)
+
(
3
n
)
)
119
Uttryck 120: negative "y" equals ( ( 2 / "n" minus 1 ) minus ( 3 "n" ) )
−
y
=
(
(
2
/
n
−
1
)
−
(
3
n
)
)
120
Uttryck 121:
121
Uttryck 122: "r" equals ( ( 3 "n" plus 1 ) / ( 2 "n" ) )
r
=
(
(
3
n
+
1
)
/
(
2
n
)
)
122
Uttryck 123: "r" equals ( ( 3 "n" plus 1 ) * ( 2 "n" ) )
r
=
(
(
3
n
+
1
)
*
(
2
n
)
)
123
Uttryck 124: "r" equals ( ( 3 "n" plus 1 ) plus ( 2 "n" ) )
r
=
(
(
3
n
+
1
)
+
(
2
n
)
)
124
Uttryck 125: "r" equals ( ( 3 "n" plus 1 ) minus ( 2 "n" ) )
r
=
(
(
3
n
+
1
)
−
(
2
n
)
)
125
Uttryck 126:
126
Uttryck 127: "r" equals ( ( 2 / "n" ) * ( 3 "n" plus 1 ) )
r
=
(
(
2
/
n
)
*
(
3
n
+
1
)
)
127
Uttryck 128: "r" equals ( ( 2 / "n" ) / ( 3 "n" plus 1 ) )
r
=
(
(
2
/
n
)
/
(
3
n
+
1
)
)
128
Uttryck 129: "r" equals ( ( 2 / "n" ) plus ( 3 "n" plus 1 ) )
r
=
(
(
2
/
n
)
+
(
3
n
+
1
)
)
129
Uttryck 130: "r" equals ( ( 2 / "n" ) minus ( 3 "n" plus 1 ) )
r
=
(
(
2
/
n
)
−
(
3
n
+
1
)
)
130
Uttryck 131:
131
Uttryck 132: "r" equals ( ( 2 / "n" plus 1 ) * ( 3 "n" ) )
r
=
(
(
2
/
n
+
1
)
*
(
3
n
)
)
132
Uttryck 133: "r" equals ( ( 2 / "n" plus 1 ) / ( 3 "n" ) )
r
=
(
(
2
/
n
+
1
)
/
(
3
n
)
)
133
Uttryck 134: "r" equals ( ( 2 / "n" plus 1 ) plus ( 3 "n" ) )
r
=
(
(
2
/
n
+
1
)
+
(
3
n
)
)
134
Uttryck 135: "r" equals ( ( 2 / "n" plus 1 ) minus ( 3 "n" ) )
r
=
(
(
2
/
n
+
1
)
−
(
3
n
)
)
135
Uttryck 136:
136
Uttryck 137: "r" equals ( ( 3 "n" minus 1 ) / ( 2 "n" ) )
r
=
(
(
3
n
−
1
)
/
(
2
n
)
)
137
Uttryck 138: "r" equals ( ( 3 "n" minus 1 ) * ( 2 "n" ) )
r
=
(
(
3
n
−
1
)
*
(
2
n
)
)
138
Uttryck 139: "r" equals ( ( 3 "n" minus 1 ) plus ( 2 "n" ) )
r
=
(
(
3
n
−
1
)
+
(
2
n
)
)
139
Uttryck 140: "r" equals ( ( 3 "n" minus 1 ) minus ( 2 "n" ) )
r
=
(
(
3
n
−
1
)
−
(
2
n
)
)
140
Uttryck 141:
141
Uttryck 142: "r" equals ( ( 2 / "n" ) * ( 3 "n" minus 1 ) )
r
=
(
(
2
/
n
)
*
(
3
n
−
1
)
)
142
Uttryck 143: "r" equals ( ( 2 / "n" ) / ( 3 "n" minus 1 ) )
r
=
(
(
2
/
n
)
/
(
3
n
−
1
)
)
143
Uttryck 144: "r" equals ( ( 2 / "n" ) plus ( 3 "n" minus 1 ) )
r
=
(
(
2
/
n
)
+
(
3
n
−
1
)
)
144
Uttryck 145: "r" equals ( ( 2 / "n" ) minus ( 3 "n" minus 1 ) )
r
=
(
(
2
/
n
)
−
(
3
n
−
1
)
)
145
Uttryck 146:
146
Uttryck 147: "r" equals ( ( 2 / "n" minus 1 ) * ( 3 "n" ) )
r
=
(
(
2
/
n
−
1
)
*
(
3
n
)
)
147
Uttryck 148: "r" equals ( ( 2 / "n" minus 1 ) / ( 3 "n" ) )
r
=
(
(
2
/
n
−
1
)
/
(
3
n
)
)
148
Uttryck 149: "r" equals ( ( 2 / "n" minus 1 ) plus ( 3 "n" ) )
r
=
(
(
2
/
n
−
1
)
+
(
3
n
)
)
149
Uttryck 150: "r" equals ( ( 2 / "n" minus 1 ) minus ( 3 "n" ) )
r
=
(
(
2
/
n
−
1
)
−
(
3
n
)
)
150
151
driven av
driven av
"x"
x
"y"
y
"a" squared
a
2
"a" Superscript, "b" , Baseline
a
b
7
7
8
8
9
9
over
÷
funktioner
(
(
)
)
less than
<
greater than
>
4
4
5
5
6
6
times
×
| "a" |
|
a
|
,
,
less than or equal to
≤
greater than or equal to
≥
1
1
2
2
3
3
negative
−
A B C
StartRoot, , EndRoot
pi
π
0
0
.
.
equals
=
positive
+
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Exempel
Linjer: Linjära funktioner
exempel
Linjer: Enpunktsformeln
exempel
Linjer: Tvåpunktsformeln
exempel
Parabler: Standardform
exempel
Parabler: Vertexform
exempel
Parabler: Standardform och tangens
exempel
Trigonometri: Våglängd och amplitud
exempel
Trigonometri: Fas
exempel
Trigonometri: Interferens
exempel
Trigonometri: Enhetscirkeln
exempel
Kägelsnitt: Cirkel
exempel
Kägelsnitt: Parabel och fokus
exempel
Kägelsnitt: Ellips med fokus
exempel
Kägelsnitt: Hyperbel
exempel
Polära ekvationer: Ros
exempel
Polära ekvationer: Logaritmisk spiral
exempel
Polära ekvationer: Limacon
exempel
Polära ekvationer: Kägelsnitt
exempel
Parameterform: Introduktion
exempel
Parameterform: Cykloid
exempel
Transformation: Avbildning av en funktion
exempel
Transformation: Förändra skalan på en funktion
exempel
Transformation: Invers av en funktion
exempel
Statistik: Linjär regression
exempel
Statistik: Anscombs kvartett
exempel
Statistik: Polynom av 4:e grad
exempel
Listor: Sinuskurvor
exempel
Listor: Stickandet av kurvor
exempel
Listor: Rita en graf från en lista med punkter
exempel
Infinitesimalkalkyl: Derivata
exempel
Infinitesimalkalkyl: Sekantlinje
exempel
Infinitesimalkalkyl: Tangentlinje
exempel
Infinitesimalkalkyl: Taylorutveckling av sin(x)
exempel
Infinitesimalkalkyl: Integraler
exempel
Infinitesimalkalkyl: Integraler med justerbara gränser
exempel
Infinitesimalkalkyl: Analysens fundamentalsats
exempel
Användarvillkor
|
Integritetspolicy
