differential calculus
DIFFERENTIAL CALCULUS
TOPIC 1: PROPERTIES OF CONTINUOUS FUNCTIONS
Theorem signo.-
Let f: [a, b] -> R be a continuous function on (a, b) so if f (x0) "0, there is an E (x0,?)
environment in which f has the same sign as f (x0 ).
If x0
Integral calculus
INTRODUCTION
One of the first achievements of the calculation was to predict the future position of an object
from a known location and function representing its speed. In addition we have, on many
occasions I found a function from known
Calculation of a house
Civil engineering plays a key for the development of peoples paper. It is notable that over the
years there have been important advances. They arise from the time of the Romans, who were
the first builders and architects. Thereafter
calculation reference
About the package:
What are its dimensions (height: a, length: l, depth: p)?
The dimensions of the milk carton Asturiana (AD) are:
a = 19'2cm
p = 5'9 cm
l = 9cm
The dimensions of the milk carton Asturiana (VD) are:
a = 23'8cm
p = 6'1
calculation
VECTOR SPACES
Definition: If n is a positive integer, then an n-tuple is an ordered sequence of n real numbers
(a1, a2, . an) The set of all ordered n-tuples is known as n-dimensional space and Rn is
denoted by
When n = 2 or 3, it is common to
Differential and Integral Calculus
I. Introduction
Calculus, branch of mathematics that deals with the study of improvements in the variables
pending curves, maximum and minimum values of functions and determination of lengths, areas
and volumes. Its use
Friction coefficient calculation
OBJECTIVE:
Calculate the coefficient of static and dynamic surface of a block of metal and wood by various
methods rozamieto.
rationale
The friction covers all resistance that opposes a body
slip or roll over another. Slid
Calculation of a wall
Strength of the masonry
In the case of walls, the coefficient of brick work of the first course, is 7 kilos per square
centimeter, ie the dcirna part of the breaking load of compression, because the masonry is
destroyed when receives
Contributions of Gauss Integral Calculus
Carl Friedrich Gauss
When Gauss was ten years old, his teacher asked the class to find the sum of all the numbers
between one and one hundred. The teacher, thinking that this class would be busy for some
time, was
Volume Calculations
Volume Calculations
By introducing the integration, we saw that the area is just one of the many applications of the
definite integral. Another important application we use the calculated volume for a three
dimensional solid.
If a regi
Calculation of derivatives
ARISING FROM A FUNCION.- Introduction.-
The derivative of a function: the study of one of the fundamental concepts of differential calculus
opens here.
In this topic, and be defined, will show its meaning and find the derivative