meta user
network profile
| bio | website | |
|---|---|---|
| location | ||
| age | ||
| visits | member for | 8 months |
| seen | Mar 3 at 14:52 | |
| stats | profile views | 66 |
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Mar 3 |
accepted | Sine-wave Phase shift |
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Mar 3 |
comment |
Sine-wave Phase shift yes that is what I tot as well... tks |
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Mar 3 |
comment |
Sine-wave Phase shift are you familiar with QAM? cause now your answer is even more confusing, updated with the full question, i just want to know if it is 90 degrees or 180 or 270 pls chk..tks |
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Mar 3 |
revised |
Sine-wave Phase shift deleted 2 characters in body |
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Mar 3 |
asked | Sine-wave Phase shift |
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Nov 11 |
comment |
Fibonacci conjecture: $(F_{n+5})^2 - (F_n)^2 = 3((F_{n+3})^2 - (F_{n+2})^2) + 8 F_{n+2} F_{n+3} $. @ArthurFischer nothing is lost..tks for doing that! |
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Nov 11 |
accepted | Expressing in rationals |
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Nov 11 |
comment |
Expressing in rationals $2+3+2\sqrt{6}-7$.... I have plus not minus |
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Nov 11 |
accepted | Fibonacci conjecture: $(F_{n+5})^2 - (F_n)^2 = 3((F_{n+3})^2 - (F_{n+2})^2) + 8 F_{n+2} F_{n+3} $. |
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Nov 11 |
comment |
Fibonacci conjecture: $(F_{n+5})^2 - (F_n)^2 = 3((F_{n+3})^2 - (F_{n+2})^2) + 8 F_{n+2} F_{n+3} $. OMG so clear! got it! got it! |
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Nov 11 |
asked | Fibonacci conjecture: $(F_{n+5})^2 - (F_n)^2 = 3((F_{n+3})^2 - (F_{n+2})^2) + 8 F_{n+2} F_{n+3} $. |
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Nov 11 |
comment |
Expressing in rationals Nice so clear.. |
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Nov 11 |
comment |
Expressing in rationals ah i got it now! its the $(a+b)^2$ formula? |
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Nov 11 |
asked | Expressing in rationals |
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Nov 11 |
accepted | Image set of a function. |
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Nov 10 |
asked | Solve for x with exact values |
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Oct 29 |
awarded | Tumbleweed |
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Oct 26 |
accepted | finding gradient of an eingenline |
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Oct 22 |
comment |
finding gradient of an eingenline except the part why the bottom ones are 0's? I understand the top part |
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Oct 22 |
comment |
finding gradient of an eingenline so the gradient m = $3.526 / 18$ ? |
