Sum Difference Product and Quotient Rules

Example 6.1. If now we take the example of the preceding paragraph, and put in the values of the two functions, we shall have, using the notation shown \[\begin{align} \frac{dy}{dx} &= \frac{d(x^2+c)}{dx} + \frac{d(ax^4+b)}{dx} \\ &= 2x + 4ax^3, \end{align}\] exactly as before.

Example 6.2. We want to differentiate the product \[(x^2 + c) \times (ax^4 + b).\]

Call \((x^2 + c) = u\); and \((ax^4 + b) = v\).

Then, by the general rule just established, we may write: \[\begin{align} \dfrac{dy}{dx} &= (x^2 + c)\, \frac{d(ax^4 + b)}{dx} &&+ (ax^4 + b)\, \frac{d(x^2 + c)}{dx} \\ &= (x^2 + c)\, 4ax^3 &&+ (ax^4 + b)\, 2x \\ &= 4ax^5 + 4acx^3 &&+ 2ax^5 + 2bx, \end{align}\] \[\dfrac{dy}{dx}= 6ax^5 + 4acx^3 + 2bx,\]

exactly as before.

Example 6.3. Going back to our example \(y = \dfrac{bx^5 + c}{x^2 + a}\),

write \[bx^5 + c = u;\] and \[x^2 + a = v.\]

Then \[\begin{align} \frac{dy}{dx} &= \frac{(x^2 + a)\, \dfrac{d(bx^5 + c)}{dx} - (bx^5 + c)\, \dfrac{d(x^2 + a)}{dx}}{(x^2 + a)^2} \\ &= \frac{(x^2 + a)(5bx^4) - (bx^5 + c)(2x)}{(x^2 + a)^2}, \\ \frac{dy}{dx} &= \frac{3bx^6 + 5abx^4 - 2cx}{(x^2 + a)^2}.\quad {(\text{Answer}.)} \end{align}\]

Example 6.4. Differentiate \(y = \dfrac{a}{b^2} x^3 - \dfrac{a^2}{b} x + \dfrac{a^2}{b^2}\).

Solution. Being a constant, \(\dfrac{a^2}{b^2}\) vanishes, and we have \[\frac{dy}{dx} = \frac{a}{b^2} \times 3 \times x^{3-1} - \frac{a^2}{b} \times 1 \times x^{1-1}.\]

But \(x^{1-1} = x^0 = 1\); so we get: \[\frac{dy}{dx} = \frac{3a}{b^2} x^2 - \frac{a^2}{b}.\]

Example 6.5. Differentiate \(y = 2a\sqrt{bx^3} - \dfrac{3b \sqrt[3]{a}}{x} - 2\sqrt{ab}\).

Solution. Putting \(x\) in the index form, we get \[y = 2a\sqrt{b} x^{\frac{3}{2}} - 3b \sqrt[3]{a} x^{-1} - 2\sqrt{ab}.\]

Now \[\frac{dy}{dx} = 2a\sqrt{b} \times \dfrac{3}{2} \times x^{\frac{3}{2}-1} - 3b\sqrt[3]{a} \times (-1) \times x^{-1-1};\] or, \[\frac{dy}{dx} = 3a\sqrt{bx} + \frac{3b\sqrt[3]{a}}{x^2}.\]

Example 6.6. Differentiate \(z = 1.8 \sqrt[3]{\dfrac{1}{\theta^2}} - \dfrac{4.4}{\sqrt[5]{\theta}} - 27\).

Solution. This may be written: \(z= 1.8\, \theta^{-\frac{2}{3}} - 4.4\, \theta^{-\frac{1}{5}} - 27\).

The \(27\) vanishes, and we have \[\frac{dz}{d\theta} = 1.8 \times -\dfrac{2}{3} \times \theta^{-\frac{2}{3}-1} - 4.4 \times \left(-\dfrac{1}{5}\right)\theta^{-\frac{1}{5}-1};\] or, \[\frac{dz}{d\theta} = -1.2\, \theta^{-\frac{5}{3}} + 0.88\, \theta^{-\frac{6}{5}};\] or, \[\frac{dz}{d\theta} = \frac{0.88}{\sqrt[5]{\theta^6}} - \frac{1.2}{\sqrt[3]{\theta^5}}.\]

Example 6.7. Differentiate \(v = (3 t^2 - 1.2 t + 1)^3\).

Solution. A direct way of doing this will be explained later; but we can nevertheless manage it now without any difficulty.

Developing the cube, we get \[v = 27 t^6 - 32.4 t^5 + 39.96 t^4 - 23.328 t^3 + 13.32 t^2 - 3.6 t + 1;\] hence \[\frac{dv}{dt} = 162 t^5 - 162 t^4 + 159.84 t^3 - 69.984 t^2 + 26.64 t - 3.6.\]

Example 6.8. Differentiate \(y = (2x - 3)(x + 1)^2\).

Solution. \[\begin{align} \frac{dy}{dx} &= (2x - 3)\, \frac{d\bigl[(x + 1)(x + 1)\bigr]}{dx}+ (x + 1)^2\, \frac{d(2x - 3)}{dx} \\ &= (2x - 3) \left[(x + 1)\, \frac{d(x + 1)}{dx}+(x + 1)\, \frac{d(x + 1)}{dx}\right] + (x + 1)^2\, \frac{d(2x - 3)}{dx} \\ &= 2(x + 1)\bigl[(2x - 3) + (x + 1)\bigr]\\ & = 2(x + 1)(3x - 2); \end{align}\] or, more simply, multiply out and then differentiate.

Example 6.9. Differentiate \(y = 0.5 x^3(x-3)\).

Solution. \[\begin{align} \frac{dy}{dx} &= 0.5\left[x^3 \frac{d(x-3)}{dx} + (x-3) \frac{d(x^3)}{dx}\right] \\ &= 0.5\left[x^3 + (x-3) \times 3x^2\right] = 2x^3 - 4.5x^2. \end{align}\]

Same remarks as for preceding example.

Example 6.10. Differentiate \(w = \left(\theta + \dfrac{1}{\theta}\right) \left(\sqrt{\theta} + \dfrac{1}{\sqrt{\theta}}\right)\).

Solution. This may be written \[w = (\theta + \theta^{-1})(\theta^{\frac{1}{2}} + \theta^{-\frac{1}{2}}).\] \[\begin{align} \frac{dw}{d\theta} &= (\theta + \theta^{-1}) \frac{d(\theta^{\frac{1}{2}} + \theta^{-\frac{1}{2}})}{d\theta} + (\theta^{\frac{1}{2}} + \theta^{-\frac{1}{2}}) \frac{d(\theta+\theta^{-1})}{d\theta} \\  &= (\theta + \theta^{-1})(\tfrac{1}{2}\theta^{-\frac{1}{2}} - \tfrac{1}{2}\theta^{-\frac{3}{2}}) + (\theta^{\frac{1}{2}} + \theta^{-\frac{1}{2}})(1 - \theta^{-2}) \\  &= \tfrac{1}{2}(\theta^{ \frac{1}{2}} + \theta^{-\frac{3}{2}} - \theta^{-\frac{1}{2}} - \theta^{-\frac{5}{2}}) + (\theta^{ \frac{1}{2}} + \theta^{-\frac{1}{2}} - \theta^{-\frac{3}{2}} - \theta^{-\frac{5}{2}}) \\&= \tfrac{3}{2} \left(\sqrt{\theta} - \frac{1}{\sqrt{\theta^5}}\right) + \tfrac{1}{2} \left(\frac{1}{\sqrt{\theta}} - \frac{1}{\sqrt{\theta^3}}\right). \end{align}\]

This, again, could be obtained more simply by multiplying the two factors first, and differentiating afterwards. This is not, however, always possible; see, for instance, Example 15.8, in which the rule for differentiating a product must be used.

Example 6.11. Differentiate \(y =\dfrac{a}{1 + a\sqrt{x} + a^2x}\).

Solution. \[\begin{align} \frac{dy}{dx} &= \frac{(1 + ax^{\frac{1}{2}} + a^2x) \times 0 - a\dfrac{d(1 + ax^{\frac{1}{2}} + a^2x)}{dx}} {(1 + a\sqrt{x} + a^2x)^2} \\ &= - \frac{a(\frac{1}{2}ax^{-\frac{1}{2}} + a^2)} {(1 + ax^{\frac{1}{2}} + a^2x)^2}. \end{align}\]

Example 6.12. Differentiate \(y = \dfrac{x^2}{x^2 + 1}\).

Solution. \[\dfrac{dy}{dx} = \dfrac{(x^2 + 1)\, 2x - x^2 \times 2x}{(x^2 + 1)^2} = \dfrac{2x}{(x^2 + 1)^2}.\]

Example 6.13. Differentiate \(y = \dfrac{a + \sqrt{x}}{a - \sqrt{x}}\).

Solution. In the indexed form, \(y = \dfrac{a + x^{\frac{1}{2}}}{a - x^{\frac{1}{2}}}\). \[\frac{dy}{dx} = \frac{(a - x^{\frac{1}{2}})( \tfrac{1}{2} x^{-\frac{1}{2}}) - (a + x^{\frac{1}{2}})(-\tfrac{1}{2} x^{-\frac{1}{2}})} {(a - x^{\frac{1}{2}})^2} = \frac{ a - x^{\frac{1}{2}} + a + x^{\frac{1}{2}}} {2(a - x^{\frac{1}{2}})^2\, x^{\frac{1}{2}}};\] hence \[\frac{dy}{dx} = \frac{a}{(a - \sqrt{x})^2\, \sqrt{x}}.\]

Example 6.14. Differentiate \[\theta = \frac{1 - a \sqrt[3]{t^2}}{1 + a \sqrt[2]{t^3}}.\]

Solution. Now \[\begin{align} \theta &= \frac{1 - at^{\frac{2}{3}}}{1 + at^{\frac{3}{2}}}. \\[9pt] \frac{d\theta}{dt} &= \frac{(1 + at^{\frac{3}{2}}) (-\tfrac{2}{3} at^{-\frac{1}{3}}) - (1 - at^{\frac{2}{3}}) \times \tfrac{3}{2} at^{\frac{1}{2}}} {(1 + at^{\frac{3}{2}})^2} \\ &= \frac{5a^2 \sqrt[6]{t^7} - \dfrac{4a}{\sqrt[3]{t}} - 9a \sqrt[2]{t}} {6(1 + a \sqrt[2]{{t^3}})^2}. \end{align}\]

Example 6.15. A reservoir of square cross-section has sides sloping at an angle of \(45^\circ\) with the vertical. The side of the bottom is \(200\) feet. Find an expression for the quantity pouring in or out when the depth of water varies by \(1\) foot; hence find, in gallons, the quantity withdrawn hourly when the depth is reduced from \(14\) to \(10\) feet in \(24\) hours.

The volume of a frustum of pyramid (see the following figure) of height \(H\), and of bases \(A\) and \(a\), is \(V = \dfrac{H}{3} \left(A + a + \sqrt{Aa} \right)\).

Solution. It is easily seen that, the slope being \(45^\circ\), if the depth be \(h\), the length of the side of the square surface of the water is \(200 + 2h\) feet (see the following figure), so that the volume of water is \[\dfrac{h}{3} [200^2 + (200 + 2h)^2 + 200(200 + 2h)] = 40,000 h + 400 h^2 + \dfrac{4 h^3}{3}.\]

\(\dfrac{dV}{dh} = 40,000 + 800h + 4h^2 = {}\) cubic feet per foot of depth variation. The mean level from \(14\) to \(10\) feet is \(12\) feet, when \(h = 12\), \(\dfrac{dV}{dh} = 50,176\) cubic feet.

Gallons per hour corresponding to a change of depth of \(4\) ft in \(24\) hours \({} = \dfrac{4 \times 50,176 \times 6.25}{24} = 52,267\) gallons.

Example 6.16. The absolute pressure, in atmospheres, \(P\), of saturated steam at the temperature \(T\) measured in Centigrades is given by Dulong as being \(P = \left( \dfrac{40 + T}{140} \right)^5\) as long as \(T\) is above \(80\,^\circ\)C. Find the rate of variation of the pressure with the temperature at \(100\,^\circ\)C.

Solution. Expand the numerator by the binomial theorem (see the appendix). \[P = \frac{1}{140^5}\left (40^5 + 5\times40^4 T+ 10 \times 40^3 T^2 + 10 \times 40^2 T^3 + 5 \times 40 T^4 + T^5\right);\]

hence \[\begin{align} \dfrac{dP}{dT} = &\dfrac{1}{537,824 \times 10^5}\left(5 \times 40^4 + 20 \times 40^3 T + 30 \times 40^2 T^2 + 20 \times 40 T^3 + 5 T^4\right), \end{align}\] when \(T = 100\) this becomes \(0.036\) atmosphere per degree Centigrade change of temperature.