One of the very first things taught in a 1st year Calculus class is the concept of the ‘Limit’. One (simplistic) way of describing it, is by saying that the Limit of the function \(\boldsymbol{f\left(x\right)}\) is what the function ‘wants to be’ as \(\boldsymbol{x}\) approaches a specific value or approaches ...
Tag: calculus
Implicit Differentiation: Three ExamplesImplicit Differentiation: Three Examples
After learning the rules (power rule, product and quotient rules, chain rule, etc.) and doing numerous exercises, a student realizes that the mechanics of Differential Calculus are not that difficult. Actually, they are almost boring, if it wasn’t for that one rule learned after all the other rules: implicit differentiation. ...
Logarithmic DifferentiationLogarithmic Differentiation
I am currently learning about this very powerful calculus tool. This tool is of great value in simplifying some functions prior to differentiation. I will try to explain simply in my own words. What are logarithms? Logarithms were invented by John Napier (1550-1617) for the purpose of simplifying calculation; basically ...
Area Between Velocity CurvesArea Between Velocity Curves
I just came across a calculus word problem about integration; specifically, the area between two curves. Two runners, starting at the same location, run along a straight road for 1 hour. The velocity of one runner is \(\boldsymbol{v_1\left(t\right) = 7t}\) and the velocity of the other runner is \(\boldsymbol{v_2\left(t\right) = 10\sqrt{t}}\). ...
DifferentialsDifferentials
A few days ago was I wrote about Linear Approximations. These are used, as the name implies, to approximate the value of a function, usually a complicated function, by way of using a much simpler linear function, as long as \(\boldsymbol{\Delta x}\) (the change in x) is small. Along with ...
Linear Approximation – What It is with ExamplesLinear Approximation – What It is with Examples
Smooth curves appear straighter on smaller scales and it is the basis of many important mathematical ideas, one of which is linear approximation. ...
The Geometric Interpretation of the Derivative and the IntegralThe Geometric Interpretation of the Derivative and the Integral
I have been trying to learn Calculus on and off for several years. In the last 3 months I re-read about Limits, Differentiation and Applications of Differentiation and finally, reached the point where I am starting to learn about Integration. It occurred to me that it might be interesting to ...
Finding the Minimum Distance – an Optimization ProblemFinding the Minimum Distance – an Optimization Problem
Every Algebra student knows the distance formula; that is, how to calculate the distance between two points on the Cartesian coordinate plane: \(\boldsymbol{d = \sqrt{\left(x_{2} – x_{1}\right)^{2} + \left(y_{2} – y_{1}\right)^{2}}}\). This week’s blogpost is about finding the distance between a specific point and the closest point(s) in a function. ...
Second Derivative Test and Inflection PointsSecond Derivative Test and Inflection Points
One of the many interesting things I’ve come across while learning calculus is the concept of concavity. A simple example of a concave function is a parabola. The left graph below shows a concave up function: \(\boldsymbol{y = x^{2}}\), while the right graph shows a concave down function: \(\boldsymbol{y = ...
Finding the Cheapest Route, an Optimization ProblemFinding the Cheapest Route, an Optimization Problem
In this post we are going to look at a function and find its minimum value analytically. Instead of just a dry exercise, it is usually more fun to tackle a word problem. All calculus textbooks have several versions of this very same problem. The problem: An island is 3.5 ...