Algebra is a branch of mathematics that deals with symbols, numbers, and the rules for manipulating them to solve equations and understand relationships between variables. It involves operations like addition, subtraction, multiplication, and division applied to unknown quantities represented by le...
Algebra Integrals Integration Notes
Algebra: Algebra is a branch of mathematics that deals with
symbols and the rules for manipulating these symbols to solve
equations and represent relationships between quantities. Here
are some key concepts in algebra:
1. Variables and Constants: In algebra, we use letters (usually x,
y, z, etc.) to represent unknown quantities called variables, and
numbers are represented by constants.
2. Expressions: An algebraic expression is a combination of
variables, constants, and mathematical operations (such as
addition, subtraction, multiplication, division, exponents, etc.). For
example, 2x + 3y - 5 is an algebraic expression.
3. Equations: An equation is a mathematical statement that shows
that two expressions are equal. Equations are often used to find
the value of the unknown variable(s). For example, 2x + 5 = 11 is
an equation.
4. Solving Equations: To solve an equation means to find the
value(s) of the variable(s) that make the equation true. This is
typically done by isolating the variable on one side of the
equation. For example, to solve 2x + 5 = 11, we subtract 5 from
both sides and then divide by 2 to get x = 3.
5. Quadratic Equations: Quadratic equations are equations of the
form ax^2 + bx + c = 0, where a, b, and c are constants, and x is
the variable. Quadratic equations have two solutions, which can be
found using the quadratic formula.
6. Factoring: Factoring is the process of expressing an algebraic
expression or equation as the product of its factors. It is often
used to simplify expressions or solve equations.
Integrals and Integration: Integration is a fundamental concept
in calculus that involves finding the area under a curve or the
accumulation of a quantity over an interval. The process of finding
integrals is called integration. Here are some details about
integrals:
1. Definite Integral: The definite integral of a function f(x) over an
interval [a, b] represents the area between the curve and the x-
axis within that interval. It is denoted by ∫[a, b] f(x) dx.
Geometrically, it corresponds to the signed area between the
curve and the x-axis.
2. Indefinite Integral: The indefinite integral of a function f(x) is
denoted by ∫f(x) dx. It represents a family of functions whose
derivative is f(x). The indefinite integral does not have specific
limits of integration.
The benefits of buying summaries with Stuvia:
Guaranteed quality through customer reviews
Stuvia customers have reviewed more than 700,000 summaries. This how you know that you are buying the best documents.
Quick and easy check-out
You can quickly pay through credit card or Stuvia-credit for the summaries. There is no membership needed.
Focus on what matters
Your fellow students write the study notes themselves, which is why the documents are always reliable and up-to-date. This ensures you quickly get to the core!
Frequently asked questions
What do I get when I buy this document?
You get a PDF, available immediately after your purchase. The purchased document is accessible anytime, anywhere and indefinitely through your profile.
Satisfaction guarantee: how does it work?
Our satisfaction guarantee ensures that you always find a study document that suits you well. You fill out a form, and our customer service team takes care of the rest.
Who am I buying these notes from?
Stuvia is a marketplace, so you are not buying this document from us, but from seller shanihonda. Stuvia facilitates payment to the seller.
Will I be stuck with a subscription?
No, you only buy these notes for $6.49. You're not tied to anything after your purchase.