1
OpenVIBE
0.0.0
(0x0000007b, 0x00006015)
y = cos(x) /(x+1) * 20
(0x00e26fa1, 0x1dbab1b2)
(0x5ba36127, 0x195feae1)
Input - A
(0x79a9edeb, 0x245d83fc)
Equation
x
cos(x)/(x+1) * 20
false
(0x1fa7a38f, 0x54edbe0b)
208
(0x1fa963f5, 0x1a638cd4)
49
(0x207c9054, 0x3c841b63)
336
(0x30a4e5c9, 0x83502953)
(0x4e7b798a, 0x183beafb)
(0x21889dc4, 0x1126497e)
(0x527ad68d, 0x16d746a0)
(0xad100179, 0xa3c984ab)
126
(0xc80ce8af, 0xf699f813)
1
(0xce18836a, 0x9c0eb403)
1
(0xcfad85b0, 0x7c6d841c)
1
(0xfba64161, 0x65304e21)
(0x000004f0, 0x00002045)
y = cos(x)
(0x00e26fa1, 0x1dbab1b2)
(0x5ba36127, 0x195feae1)
Input - A
(0x79a9edeb, 0x245d83fc)
Equation
x
cos(X)
false
(0x1fa7a38f, 0x54edbe0b)
176
(0x1fa963f5, 0x1a638cd4)
49
(0x207c9054, 0x3c841b63)
768
(0x30a4e5c9, 0x83502953)
(0x4e7b798a, 0x183beafb)
(0x21889dc4, 0x1126497e)
(0x527ad68d, 0x16d746a0)
(0xad100179, 0xa3c984ab)
63
(0xc80ce8af, 0xf699f813)
1
(0xce18836a, 0x9c0eb403)
1
(0xcfad85b0, 0x7c6d841c)
1
(0xfba64161, 0x65304e21)
(0x00000e99, 0x000033ce)
y = sin(x)
(0x00e26fa1, 0x1dbab1b2)
(0x5ba36127, 0x195feae1)
Input - A
(0x79a9edeb, 0x245d83fc)
Equation
x
sin(X)
false
(0x1fa7a38f, 0x54edbe0b)
176
(0x1fa963f5, 0x1a638cd4)
49
(0x207c9054, 0x3c841b63)
912
(0x30a4e5c9, 0x83502953)
(0x4e7b798a, 0x183beafb)
(0x21889dc4, 0x1126497e)
(0x527ad68d, 0x16d746a0)
(0xad100179, 0xa3c984ab)
61
(0xc80ce8af, 0xf699f813)
1
(0xce18836a, 0x9c0eb403)
1
(0xcfad85b0, 0x7c6d841c)
1
(0xfba64161, 0x65304e21)
(0x0000134c, 0x00005174)
Time signal
(0x28a5e7ff, 0x530095de)
(0x007deef9, 0x2f3e95c6)
Sampling frequency
512
512
false
(0x007deef9, 0x2f3e95c6)
Generated epoch sample count
32
32
false
(0x1fa7a38f, 0x54edbe0b)
96
(0x1fa963f5, 0x1a638cd4)
25
(0x207c9054, 0x3c841b63)
544
(0x4e7b798a, 0x183beafb)
(0x9e5ca01e, 0x30a4d8c3)
(0xad100179, 0xa3c984ab)
72
(0xc46b3d00, 0x3e0454e1)
(0x00000000, 0x004fd2ab)
(0x000013a6, 0x00004f67)
y = x
(0x00e26fa1, 0x1dbab1b2)
(0x5ba36127, 0x195feae1)
Input - A
(0x79a9edeb, 0x245d83fc)
Equation
x
x
false
(0x1fa7a38f, 0x54edbe0b)
208
(0x1fa963f5, 0x1a638cd4)
49
(0x207c9054, 0x3c841b63)
96
(0x30a4e5c9, 0x83502953)
(0x4e7b798a, 0x183beafb)
(0x21889dc4, 0x1126497e)
(0x527ad68d, 0x16d746a0)
(0xad100179, 0xa3c984ab)
61
(0xc80ce8af, 0xf699f813)
1
(0xce18836a, 0x9c0eb403)
1
(0xcfad85b0, 0x7c6d841c)
1
(0xfba64161, 0x65304e21)
(0x0000183a, 0x00001fb5)
y = x³
(0x00e26fa1, 0x1dbab1b2)
(0x5ba36127, 0x195feae1)
Input - A
(0x79a9edeb, 0x245d83fc)
Equation
x
pow(x,3)
false
(0x1fa7a38f, 0x54edbe0b)
208
(0x1fa963f5, 0x1a638cd4)
49
(0x207c9054, 0x3c841b63)
192
(0x30a4e5c9, 0x83502953)
(0x4e7b798a, 0x183beafb)
(0x21889dc4, 0x1126497e)
(0x527ad68d, 0x16d746a0)
(0xad100179, 0xa3c984ab)
61
(0xc80ce8af, 0xf699f813)
1
(0xce18836a, 0x9c0eb403)
1
(0xcfad85b0, 0x7c6d841c)
1
(0xfba64161, 0x65304e21)
(0x00001af6, 0x00003a73)
DSP: b/a
(0x00e26fa1, 0x1dbab1b2)
(0x5ba36127, 0x195feae1)
Input - A
(0x5ba36127, 0x195feae1)
Input - B
(0x79a9edeb, 0x245d83fc)
Equation
x
b/a
false
(0x1fa7a38f, 0x54edbe0b)
336
(0x1fa963f5, 0x1a638cd4)
49
(0x207c9054, 0x3c841b63)
928
(0x30a4e5c9, 0x83502953)
(0x4e7b798a, 0x183beafb)
(0x21889dc4, 0x1126497e)
(0x527ad68d, 0x16d746a0)
(0xad100179, 0xa3c984ab)
61
(0xc80ce8af, 0xf699f813)
1
(0xce18836a, 0x9c0eb403)
1
(0xcfad85b0, 0x7c6d841c)
1
(0xfba64161, 0x65304e21)
(0x00004ec9, 0x00005101)
Display: y = x
(0x0842bcd1, 0xd53c1c89)
(0x5ba36127, 0x195feae1)
Matrix
(0x6f752dd0, 0x082a321e)
Markers
(0x330306dd, 0x74a95f98)
Channel Localisation
${AdvancedViz_ChannelLocalisation}
${AdvancedViz_ChannelLocalisation}
false
(0x8f02e3f6, 0xffb00f4b)
Temporal Coherence
Time Locked
Time Locked
false
(0x512a166f, 0x5c3ef83f)
Time Scale
20
20
false
(0x007deef9, 0x2f3e95c6)
Matrix Count
50
50
false
(0x2cdb2f0b, 0x12f231ea)
Positive Data Only ?
false
false
false
(0x512a166f, 0x5c3ef83f)
Gain
1
1
false
(0x79a9edeb, 0x245d83fc)
Caption
false
(0x512a166f, 0x5c3ef83f)
Translucency
1
1
false
(0x7f45a2a9, 0x7db12219)
Color
${AdvancedViz_DefaultColor}
${AdvancedViz_DefaultColor}
false
(0x1fa7a38f, 0x54edbe0b)
304
(0x1fa963f5, 0x1a638cd4)
49
(0x207c9054, 0x3c841b63)
64
(0x4e7b798a, 0x183beafb)
(0x35390ab5, 0x7b926078)
(0x527ad68d, 0x16d746a0)
(0xad100179, 0xa3c984ab)
116
(0xce18836a, 0x9c0eb403)
9
(0xcfad85b0, 0x7c6d841c)
2
(0x00004ec9, 0x00005102)
Display: y = x³
(0x0842bcd1, 0xd53c1c89)
(0x5ba36127, 0x195feae1)
Matrix
(0x6f752dd0, 0x082a321e)
Markers
(0x330306dd, 0x74a95f98)
Channel Localisation
${AdvancedViz_ChannelLocalisation}
${AdvancedViz_ChannelLocalisation}
false
(0x8f02e3f6, 0xffb00f4b)
Temporal Coherence
Time Locked
Time Locked
false
(0x512a166f, 0x5c3ef83f)
Time Scale
20
20
false
(0x007deef9, 0x2f3e95c6)
Matrix Count
50
50
false
(0x2cdb2f0b, 0x12f231ea)
Positive Data Only ?
false
false
false
(0x512a166f, 0x5c3ef83f)
Gain
1
1
false
(0x79a9edeb, 0x245d83fc)
Caption
false
(0x512a166f, 0x5c3ef83f)
Translucency
1
1
false
(0x7f45a2a9, 0x7db12219)
Color
${AdvancedViz_DefaultColor}
${AdvancedViz_DefaultColor}
false
(0x1fa7a38f, 0x54edbe0b)
304
(0x1fa963f5, 0x1a638cd4)
49
(0x207c9054, 0x3c841b63)
192
(0x4e7b798a, 0x183beafb)
(0x35390ab5, 0x7b926078)
(0x527ad68d, 0x16d746a0)
(0xad100179, 0xa3c984ab)
116
(0xce18836a, 0x9c0eb403)
9
(0xcfad85b0, 0x7c6d841c)
2
(0x00004ec9, 0x00005103)
Display: y = cos(x)/(x+1) * 20
(0x0842bcd1, 0xd53c1c89)
(0x5ba36127, 0x195feae1)
Matrix
(0x6f752dd0, 0x082a321e)
Markers
(0x330306dd, 0x74a95f98)
Channel Localisation
${AdvancedViz_ChannelLocalisation}
${AdvancedViz_ChannelLocalisation}
false
(0x8f02e3f6, 0xffb00f4b)
Temporal Coherence
Time Locked
Time Locked
false
(0x512a166f, 0x5c3ef83f)
Time Scale
20
100
false
(0x007deef9, 0x2f3e95c6)
Matrix Count
50
50
false
(0x2cdb2f0b, 0x12f231ea)
Positive Data Only ?
false
false
false
(0x512a166f, 0x5c3ef83f)
Gain
1
1
false
(0x79a9edeb, 0x245d83fc)
Caption
false
(0x512a166f, 0x5c3ef83f)
Translucency
1
1
false
(0x7f45a2a9, 0x7db12219)
Color
${AdvancedViz_DefaultColor}
${AdvancedViz_DefaultColor}
false
(0x1fa7a38f, 0x54edbe0b)
304
(0x1fa963f5, 0x1a638cd4)
49
(0x207c9054, 0x3c841b63)
336
(0x4e7b798a, 0x183beafb)
(0x35390ab5, 0x7b926078)
(0x527ad68d, 0x16d746a0)
(0xad100179, 0xa3c984ab)
168
(0xce18836a, 0x9c0eb403)
9
(0xcfad85b0, 0x7c6d841c)
2
(0x00004ec9, 0x00005104)
Display: y = cos(x)
(0x0842bcd1, 0xd53c1c89)
(0x5ba36127, 0x195feae1)
Matrix
(0x6f752dd0, 0x082a321e)
Markers
(0x330306dd, 0x74a95f98)
Channel Localisation
${AdvancedViz_ChannelLocalisation}
${AdvancedViz_ChannelLocalisation}
false
(0x8f02e3f6, 0xffb00f4b)
Temporal Coherence
Time Locked
Time Locked
false
(0x512a166f, 0x5c3ef83f)
Time Scale
20
20
false
(0x007deef9, 0x2f3e95c6)
Matrix Count
50
50
false
(0x2cdb2f0b, 0x12f231ea)
Positive Data Only ?
false
false
false
(0x512a166f, 0x5c3ef83f)
Gain
1
1
false
(0x79a9edeb, 0x245d83fc)
Caption
false
(0x512a166f, 0x5c3ef83f)
Translucency
1
1
false
(0x7f45a2a9, 0x7db12219)
Color
${AdvancedViz_DefaultColor}
${AdvancedViz_DefaultColor}
false
(0x1fa7a38f, 0x54edbe0b)
256
(0x1fa963f5, 0x1a638cd4)
49
(0x207c9054, 0x3c841b63)
544
(0x4e7b798a, 0x183beafb)
(0x35390ab5, 0x7b926078)
(0x527ad68d, 0x16d746a0)
(0xad100179, 0xa3c984ab)
116
(0xce18836a, 0x9c0eb403)
9
(0xcfad85b0, 0x7c6d841c)
2
(0x00004ec9, 0x00005105)
Display: y = sin(x)
(0x0842bcd1, 0xd53c1c89)
(0x5ba36127, 0x195feae1)
Matrix
(0x6f752dd0, 0x082a321e)
Markers
(0x330306dd, 0x74a95f98)
Channel Localisation
${AdvancedViz_ChannelLocalisation}
${AdvancedViz_ChannelLocalisation}
false
(0x8f02e3f6, 0xffb00f4b)
Temporal Coherence
Time Locked
Time Locked
false
(0x512a166f, 0x5c3ef83f)
Time Scale
20
20
false
(0x007deef9, 0x2f3e95c6)
Matrix Count
50
50
false
(0x2cdb2f0b, 0x12f231ea)
Positive Data Only ?
false
false
false
(0x512a166f, 0x5c3ef83f)
Gain
1
1
false
(0x79a9edeb, 0x245d83fc)
Caption
false
(0x512a166f, 0x5c3ef83f)
Translucency
1
1
false
(0x7f45a2a9, 0x7db12219)
Color
${AdvancedViz_DefaultColor}
${AdvancedViz_DefaultColor}
false
(0x1fa7a38f, 0x54edbe0b)
224
(0x1fa963f5, 0x1a638cd4)
49
(0x207c9054, 0x3c841b63)
1056
(0x4e7b798a, 0x183beafb)
(0x35390ab5, 0x7b926078)
(0x527ad68d, 0x16d746a0)
(0xad100179, 0xa3c984ab)
116
(0xce18836a, 0x9c0eb403)
9
(0xcfad85b0, 0x7c6d841c)
2
(0x00004ec9, 0x00005106)
Display: y = MAX(cos(x), sin(x))
(0x0842bcd1, 0xd53c1c89)
(0x5ba36127, 0x195feae1)
Matrix
(0x6f752dd0, 0x082a321e)
Markers
(0x330306dd, 0x74a95f98)
Channel Localisation
${AdvancedViz_ChannelLocalisation}
${AdvancedViz_ChannelLocalisation}
false
(0x8f02e3f6, 0xffb00f4b)
Temporal Coherence
Time Locked
Time Locked
false
(0x512a166f, 0x5c3ef83f)
Time Scale
20
20
false
(0x007deef9, 0x2f3e95c6)
Matrix Count
50
50
false
(0x2cdb2f0b, 0x12f231ea)
Positive Data Only ?
false
false
false
(0x512a166f, 0x5c3ef83f)
Gain
1
1
false
(0x79a9edeb, 0x245d83fc)
Caption
false
(0x512a166f, 0x5c3ef83f)
Translucency
1
1
false
(0x7f45a2a9, 0x7db12219)
Color
${AdvancedViz_DefaultColor}
${AdvancedViz_DefaultColor}
false
(0x1fa7a38f, 0x54edbe0b)
448
(0x1fa963f5, 0x1a638cd4)
49
(0x207c9054, 0x3c841b63)
752
(0x4e7b798a, 0x183beafb)
(0x35390ab5, 0x7b926078)
(0x527ad68d, 0x16d746a0)
(0xad100179, 0xa3c984ab)
179
(0xce18836a, 0x9c0eb403)
9
(0xcfad85b0, 0x7c6d841c)
2
(0x00004ec9, 0x00005107)
Display: y = sin(x)/cos(x)
(0x0842bcd1, 0xd53c1c89)
(0x5ba36127, 0x195feae1)
Matrix
(0x6f752dd0, 0x082a321e)
Markers
(0x330306dd, 0x74a95f98)
Channel Localisation
${AdvancedViz_ChannelLocalisation}
${AdvancedViz_ChannelLocalisation}
false
(0x8f02e3f6, 0xffb00f4b)
Temporal Coherence
Time Locked
Time Locked
false
(0x512a166f, 0x5c3ef83f)
Time Scale
20
20
false
(0x007deef9, 0x2f3e95c6)
Matrix Count
50
50
false
(0x2cdb2f0b, 0x12f231ea)
Positive Data Only ?
false
false
false
(0x512a166f, 0x5c3ef83f)
Gain
1
1
false
(0x79a9edeb, 0x245d83fc)
Caption
false
(0x512a166f, 0x5c3ef83f)
Translucency
1
1
false
(0x7f45a2a9, 0x7db12219)
Color
${AdvancedViz_DefaultColor}
${AdvancedViz_DefaultColor}
false
(0x1fa7a38f, 0x54edbe0b)
448
(0x1fa963f5, 0x1a638cd4)
49
(0x207c9054, 0x3c841b63)
928
(0x4e7b798a, 0x183beafb)
(0x35390ab5, 0x7b926078)
(0x527ad68d, 0x16d746a0)
(0xad100179, 0xa3c984ab)
143
(0xce18836a, 0x9c0eb403)
9
(0xcfad85b0, 0x7c6d841c)
2
(0x000052a1, 0x00005411)
DSP: a > b ? a : b
(0x00e26fa1, 0x1dbab1b2)
(0x5ba36127, 0x195feae1)
Input - A
(0x5ba36127, 0x195feae1)
Input - B
(0x79a9edeb, 0x245d83fc)
Equation
x
a>b?a:b
false
(0x1fa7a38f, 0x54edbe0b)
336
(0x1fa963f5, 0x1a638cd4)
49
(0x207c9054, 0x3c841b63)
752
(0x30a4e5c9, 0x83502953)
(0x4e7b798a, 0x183beafb)
(0x21889dc4, 0x1126497e)
(0x527ad68d, 0x16d746a0)
(0xad100179, 0xa3c984ab)
99
(0xc80ce8af, 0xf699f813)
1
(0xce18836a, 0x9c0eb403)
1
(0xcfad85b0, 0x7c6d841c)
1
(0xfba64161, 0x65304e21)
(0x0000068d, 0x00005448)
(0x00004ec9, 0x00005101)
0
(0x1b32c44c, 0x1905e0e9)
239
(0x358ae8b5, 0x0f8bacd1)
96
(0x3f0a3b27, 0x570913d2)
275
(0x6267b5c5, 0x676e3e42)
56
(0x000011f1, 0x00003a30)
(0x00004ec9, 0x00005105)
0
(0x1b32c44c, 0x1905e0e9)
207
(0x358ae8b5, 0x0f8bacd1)
912
(0x3f0a3b27, 0x570913d2)
195
(0x6267b5c5, 0x676e3e42)
1048
(0x00001c5e, 0x000061dd)
(0x00004ec9, 0x00005102)
0
(0x1b32c44c, 0x1905e0e9)
239
(0x358ae8b5, 0x0f8bacd1)
192
(0x3f0a3b27, 0x570913d2)
275
(0x6267b5c5, 0x676e3e42)
184
(0x0000214e, 0x0000342e)
(0x00000e99, 0x000033ce)
0
(0x1b32c44c, 0x1905e0e9)
115
(0x358ae8b5, 0x0f8bacd1)
544
(0x3f0a3b27, 0x570913d2)
147
(0x6267b5c5, 0x676e3e42)
912
(0x00002734, 0x000072b2)
(0x00004ec9, 0x00005104)
0
(0x1b32c44c, 0x1905e0e9)
207
(0x358ae8b5, 0x0f8bacd1)
768
(0x3f0a3b27, 0x570913d2)
227
(0x6267b5c5, 0x676e3e42)
536
(0x000032c1, 0x00006af9)
(0x000004f0, 0x00002045)
0
(0x1b32c44c, 0x1905e0e9)
115
(0x358ae8b5, 0x0f8bacd1)
544
(0x3f0a3b27, 0x570913d2)
147
(0x6267b5c5, 0x676e3e42)
768
(0x0000387c, 0x0000579d)
(0x000052a1, 0x00005411)
0
(0x1b32c44c, 0x1905e0e9)
207
(0x358ae8b5, 0x0f8bacd1)
768
(0x3f0a3b27, 0x570913d2)
307
(0x6267b5c5, 0x676e3e42)
744
(0x00004bcd, 0x0000198d)
(0x0000007b, 0x00006015)
0
(0x1b32c44c, 0x1905e0e9)
115
(0x358ae8b5, 0x0f8bacd1)
544
(0x3f0a3b27, 0x570913d2)
179
(0x6267b5c5, 0x676e3e42)
336
(0x00004d59, 0x00005943)
(0x0000183a, 0x00001fb5)
0
(0x1b32c44c, 0x1905e0e9)
115
(0x358ae8b5, 0x0f8bacd1)
544
(0x3f0a3b27, 0x570913d2)
179
(0x6267b5c5, 0x676e3e42)
192
(0x0000504c, 0x00005ab1)
(0x000052a1, 0x00005411)
1
(0x1b32c44c, 0x1905e0e9)
207
(0x358ae8b5, 0x0f8bacd1)
912
(0x3f0a3b27, 0x570913d2)
307
(0x6267b5c5, 0x676e3e42)
759
(0x00005bc7, 0x00000def)
(0x00004ec9, 0x00005107)
0
(0x1b32c44c, 0x1905e0e9)
367
(0x358ae8b5, 0x0f8bacd1)
928
(0x3f0a3b27, 0x570913d2)
419
(0x6267b5c5, 0x676e3e42)
920
(0x00005d3d, 0x000072b2)
(0x00001af6, 0x00003a73)
1
(0x1b32c44c, 0x1905e0e9)
207
(0x358ae8b5, 0x0f8bacd1)
912
(0x3f0a3b27, 0x570913d2)
307
(0x6267b5c5, 0x676e3e42)
935
(0x00005d98, 0x0000772f)
(0x00004ec9, 0x00005106)
0
(0x1b32c44c, 0x1905e0e9)
367
(0x358ae8b5, 0x0f8bacd1)
752
(0x3f0a3b27, 0x570913d2)
419
(0x6267b5c5, 0x676e3e42)
744
(0x00007299, 0x00005ae8)
(0x000013a6, 0x00004f67)
0
(0x1b32c44c, 0x1905e0e9)
115
(0x358ae8b5, 0x0f8bacd1)
544
(0x3f0a3b27, 0x570913d2)
179
(0x6267b5c5, 0x676e3e42)
96
(0x00007987, 0x00007021)
(0x00001af6, 0x00003a73)
0
(0x1b32c44c, 0x1905e0e9)
207
(0x358ae8b5, 0x0f8bacd1)
768
(0x3f0a3b27, 0x570913d2)
307
(0x6267b5c5, 0x676e3e42)
920
(0x00007cae, 0x000067d9)
(0x00004ec9, 0x00005103)
0
(0x1b32c44c, 0x1905e0e9)
239
(0x358ae8b5, 0x0f8bacd1)
336
(0x3f0a3b27, 0x570913d2)
275
(0x6267b5c5, 0x676e3e42)
328
(0x000008ff, 0x000031d9)
You can use the letter 'X' (or 'x')
for the first input.
You can use <b>up to 16 inputs</b>.
If you are using more than 1 input
You have to use the letters <b>a</b> to <b>p</b>
for inputs 1 to 16 respectively.
(0x473d9a43, 0x97fc0a97)
1088
(0x7234b86b, 0x2b8651a5)
336
(0x000020ad, 0x000032d0)
Example simple DSPs using only one input signal
to perform mathematical operations
(0x473d9a43, 0x97fc0a97)
224
(0x7234b86b, 0x2b8651a5)
368
(0x00002cd5, 0x000004b1)
The <i>Time signal</i> is a sample box
that generates a constant increasing signal
(0x473d9a43, 0x97fc0a97)
544
(0x7234b86b, 0x2b8651a5)
48
(0x00004a0e, 0x000044ab)
<i>if-then-else</i> clause
can be achieved using
<b><i>COND ? output-true : output-false</i></b>
(0x473d9a43, 0x97fc0a97)
560
(0x7234b86b, 0x2b8651a5)
336
(0x00004b9d, 0x00000915)
The <b><i>Simple DSP</i></b> box performs
simple computations on input matrix
These computations can be <b>logical</b> or
<b>arithmetical</b>.
(0x473d9a43, 0x97fc0a97)
544
(0x7234b86b, 0x2b8651a5)
-48
(0x000065ca, 0x00001928)
You can browse each box' documentation by selecting the box and pressing <b>F1</b>
(0x473d9a43, 0x97fc0a97)
544
(0x7234b86b, 0x2b8651a5)
512
(0x0000775c, 0x000078ff)
(0x3bcce5d2, 0x43f2d968)
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