Primitivní funkce

9000150306

Část:

Vypočtěte \(\int \frac{9} {x^{5}} \, \text{d}x\) na intervalu \((0;+\infty)\).

\(- \frac{9} {4x^{4}} + c,\ c\in \mathbb{R}\)

\(\frac{9} {x^{6}} + c,\ c\in \mathbb{R}\)

\(- \frac{3} {2x^{6}} + c,\ c\in \mathbb{R}\)

\(\frac{9} {x^{4}} + c,\ c\in \mathbb{R}\)

9000150307

Část:

Vypočtěte \(\int 8\cdot 5^{x}\, \text{d}x\) na \(\mathbb{R}\).

\(\frac{8\cdot 5^{x}} {\ln 5} + c,\ c\in \mathbb{R}\)

\(\frac{8\cdot 5^{x}} {\ln x} + c,\ c\in \mathbb{R}\)

\(8\cdot 5^{x}\cdot \ln 5 + c,\ c\in \mathbb{R}\)

\(8\cdot 5^{x}\cdot \ln x + c,\ c\in \mathbb{R}\)

9000150308

Část:

Vypočtěte \(\int \frac{\cos x} {8} \, \text{d}x\) na \(\mathbb{R}\).

\(\frac{\sin x} {8} + c,\ c\in \mathbb{R}\)

\(-\frac{\sin x} {8} + c,\ c\in \mathbb{R}\)

\(\sin x + c,\ c\in \mathbb{R}\)

\(-\sin x + c,\ c\in \mathbb{R}\)

9000150106

Část:

Vypočtěte \(\int \frac{7} {2-5x}\, \mathrm{d}x\) na intervalu \(\left(\frac25;+\infty\right)\).

\(-\frac{7} {5}\ln |2 - 5x| + c,\ c\in \mathbb{R}\)

\(- \frac{7} {5\cdot \ln |2-5x|} + c,\ c\in \mathbb{R}\)

\(\frac{7} {5}\ln |2 - 5x| + c,\ c\in \mathbb{R}\)

\(\frac{7} {5\cdot \ln |2-5x|} + c,\ c\in \mathbb{R}\)

9000150108

Část:

Vypočtěte \(\int \left (\frac{3} {x} - 3x^{-2} + \frac{2} {x^{3}} \right )\, \mathrm{d}x\) na intervalu \((0;+\infty)\).

\(3\ln |x| + \frac{3} {x} - \frac{1} {x^{2}} + c,\ c\in \mathbb{R}\)

\(3\ln |x|-\frac{3} {x} - \frac{1} {x^{2}} + c,\ c\in \mathbb{R}\)

\(3\ln |x| + \frac{3} {x} + \frac{1} {x^{2}} + c,\ c\in \mathbb{R}\)

\(3\ln |x|-\frac{3} {x} + \frac{1} {x^{2}} + c,\ c\in \mathbb{R}\)

9000150105

Část:

Vypočtěte \(\int \left (6^{x} - 6x^{6}\right )\, \mathrm{d}x\) na \(\mathbb{R}\).

\(\frac{6^{x}} {\ln 6} -\frac{6x^{7}} {7} + c,\ c\in \mathbb{R}\)

\(6^{x}\ln 6 - 6x^{7} + c,\ c\in \mathbb{R}\)

\(6^{x}\ln 6 -\frac{6x^{7}} {7} + c,\ c\in \mathbb{R}\)

\(\frac{6^{x}} {\ln 6} - 6x^{7} + c,\ c\in \mathbb{R}\)

9000150107

Část:

Vypočtěte \(\int \frac{x^{3}-27} {x-3} \, \mathrm{d}x\) na intervalu \((3;+\infty)\).

\(\frac{x^{3}} {3} + \frac{3x^{2}} {2} + 9x + c,\ c\in \mathbb{R}\)

\(\frac{x^{3}} {3} -\frac{3x^{2}} {2} + 9x + c,\ c\in \mathbb{R}\)

\(\frac{x^{3}} {3} -\frac{3x^{2}} {2} - 9x + c,\ c\in \mathbb{R}\)

\(\frac{x^{3}} {3} + \frac{3x^{2}} {2} - 9x + c,\ c\in \mathbb{R}\)

9000150301

Část:

Vypočtěte \(\int 9x^{8}\, \text{d}x\) na \(\mathbb{R}\).

\(x^{9} + c,\ c\in \mathbb{R}\)

\(9x^{9} + c,\ c\in \mathbb{R}\)

\(\frac{x^{9}} {9} + c,\ c\in \mathbb{R}\)

\(9x^{7} + c,\ c\in \mathbb{R}\)

9000150101

Část:

Vypočtěte \(\int \left (\cos x -\sin x\right )\, \mathrm{d}x\) na \(\mathbb{R}\).

\(\sin x +\cos x + c,\ c\in \mathbb{R}\)

\(\sin x -\cos x + c,\ c\in \mathbb{R}\)

\(-\sin x +\cos x + c,\ c\in \mathbb{R}\)

\(-\sin x -\cos x + c,\ c\in \mathbb{R}\)

9000150102

Část:

Vypočtěte \(\int 2\sin 2x\, \mathrm{d}x\) na \(\mathbb{R}\).

\(-\cos 2x + c,\ c\in \mathbb{R}\)

\(\cos 2x + c,\ c\in \mathbb{R}\)

\(- 4\cos 2x + c,\ c\in \mathbb{R}\)

\(4\cos 2x + c,\ c\in \mathbb{R}\)

9000150306

9000150307

9000150308

9000150106

9000150108

9000150105

9000150107

9000150301

9000150101

9000150102

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