Where can I find a calculus textbook that emphasizes differentials? Is there such a book that I could realistically require my calculus students to use?
I want a textbook that supports me when I tell my students something like:
$\Delta((x^2+1)^5)\approx5(x^2+1)^4\Delta(x^2+1)\approx5(x^2+1)^4(2x\Delta x)$
$d((x^2+1)^5)=5(x^2+1)^4d(x^2+1)=5(x^2+1)^4(2x\ dx)$
Or:
$\Sigma_{k=1}^n 3x_k^2\Delta x_k\approx\Sigma_{k=1}^n\Delta(x_k^3)=x_n^3-x_1^3$
$\int_{x=0}^{x=4}3x^2\ dx=\int_{x=0}^{x=4}d(x^3)=4^3-0^3=64$
Perhaps I could write this book someday, but it'd be a lot easier for me if my students and I could just buy and/or download a book that takes this approach without neglecting to provide a cornucopia of exercises, examples, and applications similar to what's available in today's most popular calculus textbooks.
However, compared to today's textbooks, the applications feel dated, and the illustrations are too few and too primitive. (It was published in 1976.) Also, my students said it was a very difficult read; I think a partial cause was Keisler inserting more rigor than appropriate for my students, who are mostly engineering majors.
– David Milovich Mar 11 '11 at 22:30