Mathematics for Chemistry/Tests and Exams

This test was once used to monitor the broad learning of university chemists at the end of the 1st year and is intended to check, somewhat lightly, a range of skills in only 50 minutes. It contains a mixture of what are perceived to be both easy and difficult questions so as to give the marker a good idea of the student's algebra skills and even whether they can do the infamous integration by parts.

---

(1) Solve the following equation for ${\displaystyle x}$

${\displaystyle x^2+2x-15=0}$

It factorises with 3 and 5 so : ${\displaystyle (x+5)(x-3)=0}$ therefore the roots are -5 and +3, not 5 and -3!

---

(2) Solve the following equation for ${\displaystyle x}$

${\displaystyle 2x^2-6x-20=0}$

Divide by 2 and get ${\displaystyle x^2-3x-10=0}$.

This factorises with 2 and 5 so : ${\displaystyle (x-5)(x+2)=0}$ therefore the roots are 5 and -2.

---

(3) Simplify

${\displaystyle \ln w^6-4\ln w}$

Firstly ${\displaystyle 6\ln w-4\ln w}$ so it becomes ${\displaystyle 2\ln w}$.

---

(4) What is

${\displaystyle {\log }_2\frac{1}{64}}$

64 = 8 x 8 so it also equals ${\displaystyle 2^3}$x${\displaystyle 2^3}$ i.e. ${\displaystyle \frac{1}{64}}$ is ${\displaystyle 2^{-6}}$, therefore the answer is -6.

---

(5) Multiply the two complex numbers

${\displaystyle 3+5i\mathrm{a}\mathrm{n}\mathrm{d}3-5i}$

These are complex conjugates so they are ${\displaystyle 3^2}$ minus ${\displaystyle i^2}$x${\displaystyle 5^2}$ i.e. plus 25 so the total is 34.

---

(6) Multiply the two complex numbers

${\displaystyle (5,-2)\mathrm{a}nd(-5,-2)}$

The real part is -25 plus the ${\displaystyle 4i^2}$. The cross terms make ${\displaystyle -10i}$ and ${\displaystyle +10i}$ so the imaginary part disappears.

---

(7) Differentiate with respect to ${\displaystyle x}$:

${\displaystyle \frac{1}{3x^2}-3x^2}$

Answer: ${\displaystyle -\frac{2}{3x^3}-6x}$

---

(8) ${\displaystyle \frac{6}{x^4}+3x^3}$

Answer: ${\displaystyle 9x^2-\frac{24}{x^5}}$

---

(9) ${\displaystyle \frac{2}{\sqrt{x}}+2\sqrt{x}}$

Answer: ${\displaystyle \frac{1}{\sqrt{x}}-\frac{1}{\sqrt{x^3}}}$

---

(10) ${\displaystyle x^3(x-(2x+3)(2x-3))}$

Expand out the difference of 2 squares first.....collect and multiply....then just differentiate term by term giving: ${\displaystyle 20x^4-4x^3+27x^2}$

---

(11) ${\displaystyle 3x^3\cos 3x}$

This needs the product rule.... Factor out the ${\displaystyle 9x^2}$ .... ${\displaystyle 9x^2(\cos 3x-x\sin 3x)}$

---

(12) ${\displaystyle \ln (1-x{)}^2}$

This could be a chain rule problem....... ${\displaystyle \frac{1}{(1-x{)}^2}.2.(-1).(1-x)}$

or you could take the power 2 out of the log and go straight to the same answer with a shorter version of the chain rule to:${\displaystyle -\frac{2}{(1-x)}}$.

---

(13) Perform the following integrations:

${\displaystyle \int (2{\cos }^2\theta +2\theta )\mathrm{d}\theta }$

${\displaystyle {\cos }^2}$ must be converted to a double angle form as shown many times.... then all 3 bits are integrated giving .......

${\displaystyle \cos \theta \sin \theta +\theta +{\theta }^2}$

---

(14) ${\displaystyle \int (8x^{-3}-\frac{4}{x}+\frac{8}{x^3})\mathrm{d}x}$

Apart from ${\displaystyle -\frac{4}{x}}$, which goes to ${\displaystyle \ln }$, this is straightforward polynomial integration. Also there is a nasty trap in that two terms can be telescoped to ${\displaystyle \frac{16}{x^3}}$.

${\displaystyle -(\frac{8}{x^2}+4\ln x)}$

---

(15) What is the equation corresponding to the determinant:

${\displaystyle \left|\begin{array}{ccc}b& \frac{1}{\sqrt{2}}& 0\\ \frac{1}{\sqrt{2}}& b& 1\\ 0& 1& b\end{array}\right|=0}$

The first term is ${\displaystyle b(b^2-1)}$ the second ${\displaystyle -\frac{1}{\sqrt{2}}(\frac{b}{\sqrt{2}}-0)}$ and the 3rd term zero. This adds up to ${\displaystyle b^3-3/2b}$.

---

(16) What is the general solution of the following differential equation:

${\displaystyle \frac{\mathrm{d}\varphi }{\mathrm{d}r}=\frac{\mathrm{A}}{r}}$

where A is a constant..

${\displaystyle \theta =A\ln r+k}$.

---

(17) Integrate by parts: ${\displaystyle \int x\sin x\mathrm{d}x}$

Make ${\displaystyle x}$ the factor to be differentiated and apply the formula, taking care with the signs... ${\displaystyle \sin x-x\cos x}$.

---

(18)The Maclaurin series for which function begins with these terms?

${\displaystyle 1+x+x^2/2!+x^3/3!+x^4/4!+\dots }$

It is ${\displaystyle e^x}$....

---

(19)Express

${\displaystyle \frac{x-2}{(x-3)(x+4)}}$ as partial fractions.

It is ..... ${\displaystyle \frac{1}{7(x-3)}+\frac{6}{7(x+4)}}$

---

(20) What is ${\displaystyle 2e^{i4\varphi }-\cos 4\varphi }$ in terms of sin and cos

This is just Euler's equation..... ${\displaystyle 2e^{i4\varphi }=2\cos 4\varphi -2i\sin 4\varphi }$

so one ${\displaystyle \cos 4\varphi }$ disappears to give ... ${\displaystyle \cos 4\varphi -2i\sin 4\varphi }$.

(1) Simplify ${\displaystyle 2\ln (1/x^3)+5\ln x}$

---

(2)What is ${\displaystyle {\log }_{10}\frac{1}{10000}}$

---

(3) Solve the following equation for ${\displaystyle t}$

${\displaystyle t^2-3t-4=0}$

---

(4) Solve the following equation for ${\displaystyle w}$

${\displaystyle w^2+4w-12=0}$

---

(5) Multiply the two complex numbers ${\displaystyle (-4,3)\mathrm{a}\mathrm{n}\mathrm{d}(-5,2)}$

---

(6) Multiply the two complex numbers ${\displaystyle 3+2i\mathrm{a}\mathrm{n}\mathrm{d}3-2i}$

---

(7) The Maclaurin series for which function begins with these terms?

${\displaystyle x-x^3/6+x^5/120+\dots }$

---

(8) Differentiate with respect to ${\displaystyle x}$:

${\displaystyle x^3(2-3x{)}^2}$

---

(9) ${\displaystyle \frac{\sqrt{x}}{2}-\frac{\sqrt{3}}{2\sqrt{x}}}$

---

(10)${\displaystyle x^4-3x^2+\mathrm{k}}$

where k is a constant.

---

(11) ${\displaystyle \frac{2}{3x^4}-\mathrm{A}{x}^4}$

where A is a constant.

---

(12) ${\displaystyle 3x^3{e}^{3x}}$

---

(13) ${\displaystyle \ln (2-x{)}^3}$

---

(14) Perform the following integrations:

${\displaystyle \int (3w^4-2w^2+\frac{6}{5w^2})\mathrm{d}w}$

---

(15) ${\displaystyle \int (3\cos \theta +\theta )\mathrm{d}\theta }$

---

(16) What is the equation belonging to the determinant \begin{vmatrix} x & 0 & 0\\ 0 & x & i \\ 0 & i & x \\ \end{vmatrix} = 0</math>

---

(17) What is the general solution of the following differential equation:

${\displaystyle \frac{\mathrm{d}y}{\mathrm{d}x}=ky}$

---

(18) Integrate by any appropriate method:

${\displaystyle \int (\ln x+\frac{4}{x})\mathrm{d}x}$

---

(19) Express ${\displaystyle \frac{x+1}{(x-2)(x+2)}}$

as partial fractions.

---

(20) What is ${\displaystyle 2e^{i2\varphi }+2i\sin 2\varphi }$ in terms of sin and cos.

(1) Solve the following equation for ${\displaystyle t}$

${\displaystyle t^2-4t-12=0}$

---

(2) What is ${\displaystyle {\log }_4\frac{1}{16}}$

---

(3) The Maclaurin series for which function begins with these terms?

${\displaystyle 1-x^2/2+x^4/24+\dots }$---- (4) Differentiate with respect to ${\displaystyle x}$:

${\displaystyle \frac{5}{x^2}-8x^4}$

---

(5) ${\displaystyle \frac{4}{\sqrt{x}}-\sqrt{2}x}$

---

(6) ${\displaystyle 5\sqrt{x}+\frac{6}{x^3}}$

---

(7) ${\displaystyle \frac{5}{x^3}-5x^3}$

---

(8) ${\displaystyle x^2(2x^2-(5+2x)(5-2x))}$

---

(9) ${\displaystyle 2x^2\sin x}$

---

(10) Multiply the two complex numbers ${\displaystyle (2,3)\mathrm{a}\mathrm{n}\mathrm{d}(2,-3)}$

---

(11) Multiply the two complex numbers ${\displaystyle 3-i\mathrm{a}\mathrm{n}\mathrm{d}-3+i}$

---

(12) Perform the following integrations:

${\displaystyle \int (\frac{1}{3x}+\frac{1}{3x^2}-5x^{-6})\mathrm{d}x}$

---

(13)

${\displaystyle \int (6x^{-2}+\frac{2}{x}-\frac{8}{x^2})\mathrm{d}x}$

---

(14) ${\displaystyle \int ({\cos }^2\theta +\theta )\mathrm{d}\theta }$

---

(15) ${\displaystyle \int ({\sin }^3\theta \cos \theta +2\theta )\mathrm{d}\theta }$

---

(16) Integrate by parts: ${\displaystyle \int 2x\cos x\mathrm{d}x}$

---

(17) What is the equation corresponding to the determinant:

${\displaystyle \left|\begin{array}{ccc}x& -1& 0\\ -1& x& 0\\ 0& 0& x\end{array}\right|=0}$

---

(18) Express ${\displaystyle \frac{x-1}{(x+3)(x-4)}}$ as partial fractions.

---

(19)What is the general solution of the following differential equation:

${\displaystyle \frac{\mathrm{d}\theta }{\mathrm{d}r}=\frac{r}{A}}$

---

(20) What is ${\displaystyle e^{i2\varphi }-2i\sin 2\varphi }$ in terms of sin and cos.

Template:BookCat