面白い問題おしえて~な 30問目at MATH
面白い問題おしえて~な 30問目 - 暇つぶし2ch595:132人目の素数さん
20/01/13 19:35:03.21 SVhkrVyH.net
>>551
Wolframの step by stepから
Possible derivation:
d/dt(sqrt(4 - 4 t + 3 t^2)/(1 - t + t^2))
Use the quotient rule, d/dt(u/v) = (v ( du)/( dt) - u ( dv)/( dt))/v^2, where u = sqrt(3 t^2 - 4 t + 4) and v = t^2 - t + 1:
= (-sqrt(4 - 4 t + 3 t^2) (d/dt(1 - t + t^2)) + (1 - t + t^2) (d/dt(sqrt(4 - 4 t + 3 t^2))))/(1 - t + t^2)^2
Differentiate the sum term by term and factor out constants:
= ((1 - t + t^2) (d/dt(sqrt(4 - 4 t + 3 t^2))) - d/dt(1) - d/dt(t) + d/dt(t^2) sqrt(4 - 4 t + 3 t^2))/(1 - t + t^2)^2
The derivative of 1 is zero:
= ((1 - t + t^2) (d/dt(sqrt(4 - 4 t + 3 t^2))) - sqrt(4 - 4 t + 3 t^2) (-(d/dt(t)) + d/dt(t^2) + 0))/(1 - t + t^2)^2
Simplify the expression:
= (-sqrt(4 - 4 t + 3 t^2) (-(d/dt(t)) + d/dt(t^2)) + (1 - t + t^2) (d/dt(sqrt(4 - 4 t + 3 t^2))))/(1 - t + t^2)^2
The derivative of t is 1:
= ((1 - t + t^2) (d/dt(sqrt(4 - 4 t + 3 t^2))) - sqrt(4 - 4 t + 3 t^2) (d/dt(t^2) - 1))/(1 - t + t^2)^2
Use the power rule, d/dt(t^n) = n t^(n - 1), where n = 2.
d/dt(t^2) = 2 t:
= ((1 - t + t^2) (d/dt(sqrt(4 - 4 t + 3 t^2))) - sqrt(4 - 4 t + 3 t^2) (-1 + 2 t))/(1 - t + t^2)^2
Using the chain rule, d/dt(sqrt(3 t^2 - 4 t + 4)) = ( dsqrt(u))/( du) ( du)/( dt), where u = 3 t^2 - 4 t + 4 and d/( du)(sqrt(u)) = 1/(2 sqrt(u)):
= (-(-1 + 2 t) sqrt(4 - 4 t + 3 t^2) + (1 - t + t^2) (d/dt(4 - 4 t + 3 t^2))/(2 sqrt(3 t^2 - 4 t + 4)))/(1 - t + t^2)^2
Differentiate the sum term by term and factor out constants:
= (-(-1 + 2 t) sqrt(4 - 4 t + 3 t^2) + d/dt(4) - 4 d/dt(t) + 3 d/dt(t^2) (1 - t + t^2)/(2 sqrt(4 - 4 t + 3 t^2)))/(1 - t + t^2)^2
The derivative of 4 is zero:
= (-(-1 + 2 t) sqrt(4 - 4 t + 3 t^2) + ((1 - t + t^2) (-4 (d/dt(t)) + 3 (d/dt(t^2)) + 0))/(2 sqrt(4 - 4 t + 3 t^2)))/(1 - t + t^2)^2
Simplify the expression:
= (-(-1 + 2 t) sqrt(4 - 4 t + 3 t^2) + ((1 - t + t^2) (-4 (d/dt(t)) + 3 (d/dt(t^2))))/(2 sqrt(4 - 4 t + 3 t^2)))/(1 - t + t^2)^2
The derivative of t is 1:
= (-(-1 + 2 t) sqrt(4 - 4 t + 3 t^2) + ((1 - t + t^2) (3 (d/dt(t^2)) - 1 4))/(2 sqrt(4 - 4 t + 3 t^2)))/(1 - t + t^2)^2
Use the power rule, d/dt(t^n) = n t^(n - 1), where n = 2.
d/dt(t^2) = 2 t:
= (-(-1 + 2 t) sqrt(4 - 4 t + 3 t^2) + ((1 - t + t^2) (-4 + 3 2 t))/(2 sqrt(4 - 4 t + 3 t^2)))/(1 - t + t^2)^2
Simplify the expression:
= (((-4 + 6 t) (1 - t + t^2))/(2 sqrt(4 - 4 t + 3 t^2)) - (-1 + 2 t) sqrt(4 - 4 t + 3 t^2))/(1 - t + t^2)^2
Simplify the expression:
Answer: |
| = (2 - 7 t + 6 t^2 - 3 t^3)/((1 - t + t^2)^2 sqrt(4 - 4 t + 3 t^2))

次ページ
続きを表示
1を表示
最新レス表示
レスジャンプ
類似スレ一覧
スレッドの検索
話題のニュース
おまかせリスト
オプション
しおりを挟む
スレッドに書込
スレッドの一覧
暇つぶし2ch