TOPICS
This page:
calculus
Search
Dr. Math
See also the
Internet Library:
calculus
HIGH SCHOOL
About Math
Analysis
Algebra
basic algebra
equations/graphs/
translations
linear algebra
linear equations
polynomials
Calculus
Complex Numbers
Calculators/
Computers
Definitions
Discrete Math
permutations/
combinations
Exponents
Logarithms
Fibonacci Sequence/
Golden Ratio
Fractals
Functions
Geometry
Euclidean/plane
conic sections/
circles
constructions
coordinate plane
triangles/polygons
higherdimensional
polyhedra
nonEuclidean
practical geometry
symmetry/tessellations
History/Biography
Interest
Logic
Negative Numbers
Number Theory
Physics/Chemistry
Probability
Projects
Puzzles
Sequences/Series
Sets
Square/Cube Roots
Statistics
Transcendental
Numbers
Trigonometry

Browse High School Calculus
Stars indicate particularly interesting answers or
good places to begin browsing.
Selected answers to common questions:
Chain rule.
Maximizing the volume of a box.
Maximizing the volume of a cylinder.
Volume of a tank.
What is a derivative?
 Ratioing Errors [01/07/2002]

How do you calculate the error bars for ratios?
 Rational Function [04/03/1997]

Given the rational function y=r(x)=(4x^6x^4)/(x^5+5) describe its end
behavior...
 Raytrace of a Star Sapphire [12/11/1996]

How do I find the rotations necessary to create a raytrace of a star
sapphire so that the star always faces the camera?
 Rectification of a Quartic [12/02/1997]

I've been told that some 4th order equations can be rectified. Are there
any Cassinian ovals whose perimeter can be calculated without looking up
tables?
 Recurrence Relation Resolution [11/25/2013]

A student struggles to determine the limit points and explicit formula for a recurrence
relation complicated by powers and other operations. Exploiting derivatives and
ratios, Doctor Vogler shows the way.
 Related Rates [08/05/1997]

A tank contains 150 litres of brine solution. The concentration is 0.7 kg
of salt per litre... Find the time when the salt content will be 90 kg.
 Related Rates [03/11/1998]

The rate of change of the edges of a cube, given the rate of change of
its volume.
 Related Rates [03/01/1999]

A circle is inscribed in a square tangent to each side of the square. The
circumference of the circle is increasing at a constant rate of 6 inches
per second...
 Related Rates [10/16/2003]

A related rate problem involving a 2 cm long hair lying on a spherical
balloon as the balloon is inflated.
 Related Rates and a Decreasing Radius [11/18/1998]

A nitroglycerin lump is decreasing at a rate of 2 cu.cm/sec. Use related
rates to find how fast the lump's radius decreases at 9pi/4 cu.cm.
 Related Rates  Clock Hands [04/05/1999]

How fast is the distance between the tips of the hands on a watch
changing at one o'clock?
 Related Rates Problems [01/15/1999]

A plane flying horizontally at an altitude of 1 mi and a speed of 500
miles/hour...
 The Relation of the Speed of a Boat to the Water Line [2/27/1996]

What is the mathematical formula or equation for calculating the speed of
a boat as it relates to the water line of the boat.?
 The Relationship of the Tangent to a Curve and the Area under a Curve [10/25/1995]

The problem of drawing a tangent to a given curve at a given point is
closely connected to the problem of finding areas ("areas under a
curve"). What is the connection, and when and by whom was it discovered?
 Relative and Absolute Extrema of a Function [01/07/2004]

What is the difference between the absolute extrema and the relative
extrema in calculus?
 Relativity [05/22/2002]

How do you demonstrate algebraically that [the following expressions]
are proportional to each other even when they describe 'events' that
are not on the expanding wavefront of light?
 The Riemann Sum of Sin(x) [02/07/2001]

How do you evaluate the integral of sin(x) from 0 to pi by Riemann sum?
 Riemann Sums and Antiderivatives [07/11/1999]

Are there any other ways of illustrating the link between Riemann sums
and antiderivatives?
 Riemann Sums and the Integral [01/18/1999]

Why does the limit of Riemann sums turn out to be the integral? How is
that derived? What is behind it?
 A Rumor Spreads [04/01/1999]

A rumor spreads through a community at the rate dy/dt = 2y(1y), where y
is the proportion of the population that has heard the rumor at time t...
 Sea Navigation: Great Circles [11/4/1994]

In sea navigation, given two points A,B with LON and LAT coordinates,
find the travel distance from A to B. The distance is actually the great
circle passing A and B. The solution is needed in the form of a double
integral where the first int covers the LONs and the second the LATs. I
guess the difficult part is to form the vector.
 Second Derivative of a Function With Absolute Values [02/27/1998]

Let f(x) = x^3. Find f"(0).
 Second Order Differential Equation [11/04/2001]

By letting p = dy/dx, solve y(d2y/dx2) = 2 (dy/dx)2.
 Sequences and Series [4/27/1996]

Determine the number of arithmetic means between two numbers whose sum is
5.5.
 Setting Interest Rate to Maximize Profit [7/25/1996]

A loan company is limited to charging maximum 18 percent interest on a
loan. The amount of money available for loans is proportional to the
interest rate the company will pay its investors...
 Shakespearean Differential Equations [10/27/1998]

Can you help me solve these differential equations: dG/dt=aJbG and dJ/
dt=cG?
 Shortest Distance between a Point and a Circle [1/22/1996]

Find the shortest distance between the point (4,5) and the circumference
of x^2 + y^2 = 9.
 Simplifying and Solving a Natural Log Problem [11/15/1995]

Integrate ln(r/a)dr  the limits are a to b. Is this possible, or is
there some table for it?
 Simpson's Rule [04/12/1997]

Find the volume of the solid formed if the curve y = cos 1 x is rotated
about the xaxis between x=0 and x=1.
 Simpson's Rule  Alternating Pattern [09/20/1997]

I'm trying to apply Simpson's rule to a computer program, but I don't
understand it well enough  can you tell me how it works?
 Simpson's Rule for Cubics [10/23/2000]

Why is Simpson's rule exact for cubic polynomials?
 Simpson's Rule/Trapezoid Rule [02/01/1998]

How is Simpson's rule derived and why it is a better approximation of the
integral than the midpoint (rule?) or trapezoidal method?
 Sketching a Function [07/06/1998]

Can you help me piece a function together so that the following hold? It
is increasing and concave up on (infinity, 1) ...
 Sketching a Graph Given Information about Its Derivatives [07/30/2005]

We've been learning how to analyze a function by using the first and
second derivatives to test if the graph is increasing/decreasing and
concave up/down. But now we have to sketch the graph given some
information about the derivatives and some specific points on the graph.
 Slope of 3Dimensional Equations [11/12/1997]

Is it possible to find the slope of threedimensional equations?
 Slope of root x. . . [12/14/1994]

How do I find the slope of: root x = ln (xy) at (4,2) ?
 Slope of the Tangent [1/9/1995]

Given y = A sinx + B tanx. Find A and B if the slope of the tangent to
the curve at x1 = pi/4 is m1 = 4 + root 2, and at x = 0, m2 = 4.
 Snail! [06/20/2002]

A snail is climbing a windowpane, beginning in the evening at a
height of e minus 1 meter from the base. It loses 1 meter each night.
On the second day, it doubles its altitude of the morning. On the
third day, it triples the altitude of the morning, and so on. What
will be its altitude on the 51st day at dawn?
 Solve It Numerically [05/21/1997]

How do you solve the equation x^x = 100?
 Solving a Differential Equation [6/5/1996]

The integral looking somewhat like this: S ((e^u)/u) du has resisted
every attack on my part.
Page: [<prev]
1
2
3
4
5
6
7
8
9
10
11
12
13
14
15
16
17
[next>]
