This is a list of errors in the CLP 2 textbook identified since May 13, 2023.
Date | Page | Section | Description of error | Who reported it |
---|---|---|---|---|
August 4, 2023 | P.210 | Section 1.12 | The last integral in Theorem 1.12.22 is missing the "dx". | Vicky Nguyen |
December 4, 2023 | P.257 | Section 2.4 | In the second last bullet of Example 2.4.15, "12.7 billion" should be "25.4 billion". | Saksham Joshi |
January 12, 2024 | P.16 | Section 1.1.3 | The last word of Section 1.1.3 should be "function" rather than "functional". | Lyndon Ho |
January 13, 2024 | P.27 | Section 1.1.6 | Near the end of Example 1.1.18, "This exactly the left Riemann sum" should be "This is exactly the left Riemann sum". | Raymond Lu |
January 29, 2024 | P.161 | Section 1.10 | The very last term of Equation 1.10.11 in Section 1.10 should have $$C_{k,n_k}$$ instead of $$C_{1,n_k}$$ in the numerator. | Pinn Yee Scott |
February 18, 2024 | P.255 | Section 2.4 | In the second sentence of Example 2.4.13 "temperature of the body 1s" should be "temperature of the body is". | Riku Komiya |
February 21, 2024 | P.185 | Section 1.11.4 | Just before the figure in Section 1.11.4 $$\text{approx value of $\int_a^b f(x)\,dx$ given by $n$ Simpson's steps } \approx \int_a^b f(x)\,dx+K_M\cdot \frac{1}{n^4}$$ should be $$\text{approx value of $\int_a^b f(x)\,dx$ given by $n$ Simpson's steps } \approx \int_a^b f(x)\,dx+K_S\cdot \frac{1}{n^4}$$ | Raymond Lu |
March 17, 2024 | P.100 | Section 1.6 | In the second last bullet of Example 1.6.9 "When we rotate the region about the line y=0" should be "When we rotate the region about the y-axis". | Caleb Cheuk |
March 31, 2024 | P.196 | Section 1.12 | The first sentence after Definition 1.12.4 should end with a period. | Omar Bseiso |
April 7, 2024 | P.273 | Section 3.1 | In the second last line of Example 3.1.11 $$a_n=1,\ b_n=1+\frac{\pi_n}{n},\ \text{and}\ c_n=1+\frac{9}{n}$$ should be $$a_n=1,\ c_n=1+\frac{\pi_n}{n},\ \text{and}\ b_n=1+\frac{9}{n}$$ | Emma Savu |
April 17, 2024 | P.187 | Section 1.11.4 | In the third paragraph after Figure 1.11.1 in Section 1.11.4, "0000166" appears three times. It should be "0.0000166". | Seabert Yuan |
This is a list of errors in the CLP 2 problem book identified since May 13, 2023.
Date | Page | Section | Description of error | Who reported it |
---|---|---|---|---|
June 17, 2023 | P.300 | Solutions section 1.4 | In Solution S-19, just before the first displayed equation $$\tan^2 = \sec^2\theta-1$$ should be $$\tan^2\theta = \sec^2\theta-1$$. | Peter Gledhill |
July 24, 2023 | P.83 | Section 2.4 | In Q[3] of Section 2.4, the first displayed equation should end with $$ f(x)\,g(y(x))$$ rather than $$ f(x)\,g(y(x)))$$. | Manav Gill |
August 27, 2023 | P.118 | Section 3.5 | At the end of the first sentence of Q[24] of Section 3.5, "covergence" should be "convergence". | Manav Gill |
November 28, 2023 | P.670 | Section 3.4 | In S[14] of Section 3.4, "379/720" should be "389/720". | Jaibrian Greer |
January 2, 2024 | Section 1.11.6 | In 1.11.6.15 in the solutions section of the online version, "cross--sectional" should be "cross-sectional". | Vicky Nguyen | |
January 22, 2024 | P.265 | Section 1.2 | In Solution S-3(a) of Section 1.2, $$-\int_{3}^{2} f(x) dx = -1$$ should be $$-\int_{3}^{2} f(x) dx = 1$$. | Martin Wong |
March 11, 2024 | P.437 | Section 1.11 | About one third of the way through Solution S-33 of Section 1.1, $$\left|\frac{25(5x^4-10x^2+1)}{(x^2+1)^5}\right|$$ should be $$\left|\frac{24(5x^4-10x^2+1)}{(x^2+1)^5}\right|$$. | Martin Wong |
March 17, 2024 | P.315 | Section 1.5 | In the last bullet of Solution S-17 in Section 1.5, $$A_2=\frac{9\pi}{8}$$ should be $$A_3=\frac{9\pi}{8}$$. | Oliver Hartley |
March 19, 2024 | P.339 | Section 1.7 | At the end of Solution S-6 in Section 1.7, $$\int\underbrace{x}_{u}\underbrace{\log x\,d{x}}_{d{v}}$$ should be $$\int\underbrace{\log x}_{u}\ \underbrace{x\,d{x}}_{d{v}}$$. | Steven Qin |
April 17, 2024 | P.120,224,692 | Section 3.6 | In part (c) of Question 4 in Section 3.6, change the definition of h to $$h(x)=\frac{\arctan(5x^2)}{x^2}$$ Then the answer becomes $$h^{(20)}(0)=-\frac{20!\cdot 5^{11}}{11};\quad h^{(22)}(0)=0$$ | |
April 17, 2024 | P.689 | Section 3.5 | In the second displayed equation of Solution S-27 in Section 3.5, "N(n+1)+1" should be "2(N+1)+1". | Anthony Sheu |
April 19, 2024 | P.722 | Section 3.6 | In the big multiline displayed equation of Solution S-53 in Section 3.6, the red terms on the right hand sides of rows three and four should have denominator (2n+1)!, and blue terms on the right hand sides of rows three, four and five should have denominator (2n)!. | Anthony Sheu |