Enrhifo
-\frac{2001x^{2}}{25000000000000000000}
Gwahaniaethu w.r.t. x
-\frac{2001x}{12500000000000000000}
Graff
Rhannu
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-667\times 10^{-11}\times \frac{18x^{2}}{15\times 10^{8}}
Lluosi x a x i gael x^{2}.
-667\times \frac{1}{100000000000}\times \frac{18x^{2}}{15\times 10^{8}}
Cyfrifo 10 i bŵer -11 a chael \frac{1}{100000000000}.
-\frac{667}{100000000000}\times \frac{18x^{2}}{15\times 10^{8}}
Lluosi -667 a \frac{1}{100000000000} i gael -\frac{667}{100000000000}.
-\frac{667}{100000000000}\times \frac{6x^{2}}{5\times 10^{8}}
Canslo 3 yn y rhifiadur a'r enwadur.
-\frac{667}{100000000000}\times \frac{6x^{2}}{5\times 100000000}
Cyfrifo 10 i bŵer 8 a chael 100000000.
-\frac{667}{100000000000}\times \frac{6x^{2}}{500000000}
Lluosi 5 a 100000000 i gael 500000000.
-\frac{667}{100000000000}\times \frac{3}{250000000}x^{2}
Rhannu 6x^{2} â 500000000 i gael \frac{3}{250000000}x^{2}.
-\frac{2001}{25000000000000000000}x^{2}
Lluosi -\frac{667}{100000000000} a \frac{3}{250000000} i gael -\frac{2001}{25000000000000000000}.
\frac{\mathrm{d}}{\mathrm{d}x}(-667\times 10^{-11}\times \frac{18x^{2}}{15\times 10^{8}})
Lluosi x a x i gael x^{2}.
\frac{\mathrm{d}}{\mathrm{d}x}(-667\times \frac{1}{100000000000}\times \frac{18x^{2}}{15\times 10^{8}})
Cyfrifo 10 i bŵer -11 a chael \frac{1}{100000000000}.
\frac{\mathrm{d}}{\mathrm{d}x}(-\frac{667}{100000000000}\times \frac{18x^{2}}{15\times 10^{8}})
Lluosi -667 a \frac{1}{100000000000} i gael -\frac{667}{100000000000}.
\frac{\mathrm{d}}{\mathrm{d}x}(-\frac{667}{100000000000}\times \frac{6x^{2}}{5\times 10^{8}})
Canslo 3 yn y rhifiadur a'r enwadur.
\frac{\mathrm{d}}{\mathrm{d}x}(-\frac{667}{100000000000}\times \frac{6x^{2}}{5\times 100000000})
Cyfrifo 10 i bŵer 8 a chael 100000000.
\frac{\mathrm{d}}{\mathrm{d}x}(-\frac{667}{100000000000}\times \frac{6x^{2}}{500000000})
Lluosi 5 a 100000000 i gael 500000000.
\frac{\mathrm{d}}{\mathrm{d}x}(-\frac{667}{100000000000}\times \frac{3}{250000000}x^{2})
Rhannu 6x^{2} â 500000000 i gael \frac{3}{250000000}x^{2}.
\frac{\mathrm{d}}{\mathrm{d}x}(-\frac{2001}{25000000000000000000}x^{2})
Lluosi -\frac{667}{100000000000} a \frac{3}{250000000} i gael -\frac{2001}{25000000000000000000}.
2\left(-\frac{2001}{25000000000000000000}\right)x^{2-1}
Deilliad ax^{n} yw nax^{n-1}.
-\frac{2001}{12500000000000000000}x^{2-1}
Lluoswch 2 â -\frac{2001}{25000000000000000000}.
-\frac{2001}{12500000000000000000}x^{1}
Tynnu 1 o 2.
-\frac{2001}{12500000000000000000}x
Ar gyfer unrhyw derm t, t^{1}=t.
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