Gwahaniaethu w.r.t. j_33965
-\frac{325}{\left(j_{33965}-325\right)^{2}}
Enrhifo
-\frac{j_{33965}}{325-j_{33965}}
Rhannu
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\frac{\left(-j_{33965}^{1}+325\right)\frac{\mathrm{d}}{\mathrm{d}j_{33965}}(-j_{33965}^{1})-\left(-j_{33965}^{1}\frac{\mathrm{d}}{\mathrm{d}j_{33965}}(-j_{33965}^{1}+325)\right)}{\left(-j_{33965}^{1}+325\right)^{2}}
Ar gyfer unrhyw ddau ffwythiant y mae modd eu gwahaniaethu, deilliad cyniferydd dau ffwythiant yw’r enwadur wedi’i luosi â deilliad yr enwadur wedi’i dynnu o’r rhifiadur wedi’i luosi â deilliad yr enwadur, y cwbl wedi’i rannu â’r enwadur wedi'i sgwario.
\frac{\left(-j_{33965}^{1}+325\right)\left(-1\right)j_{33965}^{1-1}-\left(-j_{33965}^{1}\left(-1\right)j_{33965}^{1-1}\right)}{\left(-j_{33965}^{1}+325\right)^{2}}
Deilliad polynomaial yw swm deilliadau ei dermau. Deilliad term cyson yw 0. Y deilliad o ax^{n} yw nax^{n-1}.
\frac{\left(-j_{33965}^{1}+325\right)\left(-1\right)j_{33965}^{0}-\left(-j_{33965}^{1}\left(-1\right)j_{33965}^{0}\right)}{\left(-j_{33965}^{1}+325\right)^{2}}
Gwneud y symiau.
\frac{-j_{33965}^{1}\left(-1\right)j_{33965}^{0}+325\left(-1\right)j_{33965}^{0}-\left(-j_{33965}^{1}\left(-1\right)j_{33965}^{0}\right)}{\left(-j_{33965}^{1}+325\right)^{2}}
Ehangu gan ddefnyddio’r briodwedd ddosbarthol.
\frac{-\left(-1\right)j_{33965}^{1}+325\left(-1\right)j_{33965}^{0}-\left(-\left(-1\right)j_{33965}^{1}\right)}{\left(-j_{33965}^{1}+325\right)^{2}}
I luosi pwerau sy’n rhannu’r un sail, ychwanegwch eu hesbonyddion.
\frac{j_{33965}^{1}-325j_{33965}^{0}-j_{33965}^{1}}{\left(-j_{33965}^{1}+325\right)^{2}}
Gwneud y symiau.
\frac{\left(1-1\right)j_{33965}^{1}-325j_{33965}^{0}}{\left(-j_{33965}^{1}+325\right)^{2}}
Cyfuno termau sydd yr un peth.
\frac{-325j_{33965}^{0}}{\left(-j_{33965}^{1}+325\right)^{2}}
Tynnu 1 o 1.
\frac{-325j_{33965}^{0}}{\left(-j_{33965}+325\right)^{2}}
Ar gyfer unrhyw derm t, t^{1}=t.
\frac{-325}{\left(-j_{33965}+325\right)^{2}}
Ar gyfer unrhyw derm t ac eithrio 0, t^{0}=1.
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