Essays on Mathematics

Free essays on Mathematics are written pieces of content on different aspects of mathematics that can be accessed without any cost. These essays cover various topics in mathematics such as algebra, geometry, calculus, probability, statistics, and more. They provide an in-depth understanding of the subject and help students learn new concepts and ideas. Free essays on Mathematics serve as useful study materials for students at any academic level and assist in preparing them for exams or other assignments. These essays are written by experts in the field and are available online on various platforms.
Finding Limits Analytically. Example Problem 3
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Finding Limits Analytically. Example Problem 3 Find: lim_(x->2) f(x) [Graph] Let f(x)={x^2+4; 3x+1; x>2, x<=2 lim_(x->2) f(x) lim_(x->2) -3x+1=7 -> lim_(x->2)-f(x)/=lim_(x->2)+f(x) lim_(x->2)+x^2 +4=8 -> :. lim_(x->2) f(x) DNE We can see a piecewise function at work in the following example. So, x to the second power plus and we'll do this for values greater than 2. And perhaps we'll do 3x plus 1 for values less than or equal to 2. We're interested in finding the limit as x approaches…...
Calculus
Matrix Multiplication: Understanding its Origins and Order
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Where does matrix multiplication come from? What AB Represents The product AB represents the transformation B followed by transformation A. That is a counterintuitive concept, which we are accustomed to writing from left to right. Unfortunately, matrices are defined by rules that require multiplication from right to left. If you think about it, when you write a function f times a different function g, what you're really saying is apply g, then f. Multiplying matrices is done in reverse order…...
Calculus
Linear Approximations and Tangent Planes. Visualize in 3-dimensions
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Linear approximations and tangent planes. Visualize in 3-dimensions We use the level curves to help visualize the graph of a function. The z-coordinate leaving the board is equal to the value of the function. As a visual aid, imagine a map of elevation levels, with zero representing the lowest point, and one through five gradually ascending to the highest point. All points in this line have an elevation of 0; all points on that line have an elevation of 1;…...
Calculus
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Exploring Differentiability: Understanding Smoothness and Derivatives
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Differentiability Differentiability is a measure of how smooth a function is. A function is differentiable at a point if its derivative exists at that point and is non-zero. The graph of a differentiable function is infinitely thin in the sense that it can be covered by an arbitrarily small rectangle. A simple way to think about differentiability is as follows: If you draw two tangent lines to a curve at two different points, and then draw all the possible curves…...
Calculus
Recitation video: Lagrange multipliers with 3 variables
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Recitation video: Lagrange multipliers with 3 variables Lagrange multipliers can be used to optimize a function of several variables subject to a constraint. Find the maximum and minimum values of the function f(x,y,z)=x^2+x+2y^2+3z^2 as (x,y,z) varies on the unit sphere x^2+y^2+z^2=1 We have a function of the variables xv. equals × squared plus x plus 2y squared plus 3z squared. What we'd like you to do is find the maximum and minimum values that this function takes as the point…...
Calculus
The Equation of Tangent Lines and Local Linearity
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Tangent Lines We have been using the word "tangent" repeatedly. Now we are going to give an equation for the tangent line to a curve at a point and discuss how to determine whether a function is locally linear by examining its graph. We're going to create a function, fof x. We'll call it the slope of the tangent line. The derivative at any given point on this function will be the slope of the tangent line drawn to that…...
Calculus
Power Rule for Derivatives
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Power Rule for Derivatives The power rule is one of a number of derivative rules in calculus. The power rule says that if a function is raised to a power, then the derivative is equal to that function raised to the same power times the original function's derivative. For example, suppose we are given a function f(x) and its derivative f'(x), then the power rule savs: If f(x) = xn, then f'(x) = nxn-1 The power rule is a shortcut…...
Calculus
Exploring Vector Decomposition: Unraveling Data Components and Force Analysis
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Vector decomposition Vector decomposition is a technique used in statistical analysis to break down a dataset into its various components. The purpose of vector decomposition is to determine the variance of each component, which allows for a more accurate analysis of the data. Vector decomposition can be used to analyze stock prices, economic data and other types of data sets that contain multiple variables. Vector decomposition uses a series of mathematical equations to break down each variable into its most…...
Calculus
Comparison to the Quadratic Formula
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Comparison to the quadratic formula It needs to be pointed out: Here we have a special quadratic expression. The quadratic formula is similar, but uses b2 - 4ac rather than b2 - 4bc. Let's see how the quadratic formula applies here. Let's present the same data differently to reach the same conclusion. Here, we have written the expression as y2 times a x over y2 plus b x over y + c. Since x and y are both non-negative, the…...
Calculus
Matrix-Matrix Multiplication: Combining Matrices and Unraveling Dot Products
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Matrix-Matrix multiplication A Matrix-Matrix multiplication is a mathematical operation that multiplies the two matrices. The first matrix (the "a" matrix) is multiplied by the second matrix (the "b" matrix). The resulting third matrix iS called a "c' matrix. Matrix-Matrix multiplication is an operation that combines two matrices together to create a third matrix. The process involves multiplying every element of one matrix by the corresponding element of another, and then adding up all of these products. The result is a…...
Calculus
Power Rule for Derivatives. Example Problem 1
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Power Rule for Derivatives. Example Problem 1 f(x)=2x^4 -7x^3 +5x-6sqrtx Find f'(x) 6x^1/2 f'(x)=8x^3 -21x^2 +5-3x^-(1/2) f'(x)=8-21+5-3=-11 Let's create a function f of x. We'll say, 2x to the 4th minus 7x cubed plus 5x minus 6 square root of x. Let's find the derivative off prime, given that f is equal to 1. Now that we know the power rule, we can find f'(x), which is just one of many derivatives. And by the way, it's really important that…...
Calculus
Warm up: Linear approximations
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Warm up: Linear approximations Here is a little warm up. We are gonna to review of linear approximation. The task is to find the linear approximation of this function. f(1+Δx),1+Δy)~~-1+...Δx+...Δy If(x,y)near(1,1) F(x,y)~~...x+...y+... The main point of the warm-up is to practice writing both linear and quadratic approximations using two different methods. We will then check to see why there are two ways of writing it....
Calculus
Order Matters:AB is not BA in Matrix Operations
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Caution: order matters. AB is not BA Note that AB and BA are not the same thing at all. From this interpretation, it is clear that the conversion of oranges to bananas is not the same as the conversion of carrots to oranges. The other hand--well, actually it may be worse than we thought. The thing may not even be well-defined. Cause if the width of A is equal to the height of B. then we can do this product.…...
Calculus
Infinity and Asymptotes: Exploring Limits and Vertical Asymptotes
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Limits Involving Infinity In this section, we'll look at limits to infinity, positive infinity, and horizontal and vertical asymptotes. When we talk about horizontal asymptotes and limits to infinity, some functions might not have a horizontal asymptote. lim_(x-> infinity) f(x) [Graph] lim_(x-> -infinity) f(x) [Graph] [Graph] __________________________________________________ [Graph][Graph] lim_(x->a) f(x) [Graph] [Graph] A function could be represented by this equation. And as x approaches infinity, the value of y approaches 0. But instead of the asymptote being at 0, we…...
Calculus
Linear Approximations and Tangent Planes. Linear Approximation Review
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Linear approximations and tangent planes. Linear approximation: review Given a function of one variable, g of x, linear approximation tells us how the function a changes if we change x by a small amount. If we look at the graph of g at x0 plus Delta x, we see that it is approximately the graph of g of x0 plus g prime of x0 times Delta x. This approximation works well if Delta x is small. Let's do simple example.…...
Calculus
Robot Arm Matrix Setup
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Robot Arm Matrix Setup It would be good to work with you on this problem because it was challenging problem before, and many students were uncertain how to approach it. In addition, it is a part of our theme of matrices. The fact that mathematical expressions that are matrices keep coming up in various problems that don't sound related to each other should make us think about how such expressions might be used. Here we can think of matrice. Because…...
Calculus
Interpreting Trade Agreements and Currency Strength: Logic and Implications
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Introduction to Mathematical Thinking. Tutorial for Assignment New trade agreement will lead to strong currencies in both countries. So the trade agreement will result in telling us that both currencies are strong. That one is direct and easy to understand. The strong dollar indicates that the yuan isweak. It seems straight forward. The value of the dollar and the yuan are inversely correlated, so a weak dollar implies a weak yuan. The trade agreement failed because the dollar weakened, which…...
Mathematics
Power Rule for Derivatives. Example Problem 2
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Power Rule for Derivatives. Example Problem 2 f(x)=x^3 -9x^2 -48x+5 f'(x)=0 f'(x)=3x^2 -18x-48=0 3(x^2 -6x-16)=0 3(x-8)(x+2)=0 x=8, -2 So. Now you need to find the values of x for which f(x) = x3 - 9x2 - 48x + 5 has a horizontal tangent. If we have a horizontal tangent, that means there's going to be a slope of 0-that is, f(x) = 0. That means the derivative of f(x) is equal to 0. We will find f prime of x,…...
Calculus
The Geometry of Linear Approximation
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The geometry of linear approximation A linear approximation of a function is a polynomial that passes through the sample points and has the same slope at each of them. The linear approximation of a function is often used in statistics; many statistical methods assume that the data are generated by some underlying model, and the linear approximation provides an alternative expression for the model's predictions. Let's go through it. So we take the x derivative of that. If we plug…...
Calculus
Critical Point Type for a Quadratic Function
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Critical point type for a quadratic function We will use the second derivative test to find a maximum or minimum value for an equation. By definition, if y'=0, then there must be a local maximum or minimum at that point. The main problem is that we have more possible situations and have several derivatives, so we need to think harder about how we will decide. However, it will involve the second derivatives again. Let us examine an example in which…...
Calculus
Decomposition of Vectors: Analyzing the General Case
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General Case So it is this vector. Why? Well, if we consider the right triangle formed by this vector, we can read off its components from this right triangle. We begin by noting that the length of w is equal to the length of v. So the length of w is v2. This side is v2, the length of w. What about this side? The cosine of theta is v2 on this side, and the sine of theta is v2…...
Calculus
Derivatives of Inverse Trig Functions
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Derivatives of inverse trig functions In the real world, trigonometric functions are used to model many trpes of motion. The derivative of these functions can be used to determine how quickly an object is accelerating, or how fast it is moving at any given time. Knowing the derivative and inverse relations of trig functions has practical applications in physics and engineering. We will develop the basic formulas for inverse trigonometric functions. To begin, let us consider the arc sine function.…...
Calculus
Cases for a Quadratic Function
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Cases for a quadratic function There are three possibilities to consider, let's first eliminate the most complicated one. Suppose 4ac - b2 is negative. If this is the case, then it means that what is between the brackets is actually a positive quantity while the second term will be negative times y2. So it will be a negative quantity. One term will be positive, and one term will be negative. This tells us that we actually have a saddle point…...
Calculus
Finding Limits Analytically. Example Problem 1
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Finding Limits Analytically. Example Problem 1 Find: lim_(x->-4) (x^2 -6x-40)/(x^2 +6x+8) lim_(x->-4) ((x+4)(x-10))/((x+4)(x-2)) lim_(x->-4) (x-10)(x-2)=-14/-2=7 We can find the limit of an algebraic expression in several ways. One way is to use simple substitution, but that doesn't work for indeterminate forms; evaluating numerator and denominator with negative 4 will yield 0/0. To clear up the 0/0, we need to factor. The top factors of 4x - 10 are 4x + 2 and 4x - 2 The denominator factors of 4x…...
Calculus
Definition of Derivative. Example Problem 1
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Definition of Derivative. Example Problem 1 Order the slopes of the tangent lines at the given points for the graph below. [Graph] Let's consider a function f. We'll plot the function on the standard coordinate plane and consider the slopes of its tangent lines at various points. Basically, we are going to order the slopes of the lines tangent to the graph of fat given points from least to greatest. Of course, one can be negative and one can be…...
Calculus
Level Curves and Partial Derivatives
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Level curves and partial derivatives. Partial derivatives: definitions Partial derivatives are a notation used to express the derivative of a function with respect to one of its variables, holding other variables constant. A function of several variables may have partial derivatives with respect to each variable, but it does not have a derivative in the usual sense. δf/δx(x_0,y_0)=lim_(Δx->0) (f(x_0+Δx,y_0)-f(x_0,y_0))/Δx partial δf/δx(x_0,y_0)=lim_(Δy->0) (f(x_0,y_0+Δy)-f(x_0,y_0))/Δy This symbol is a capital d with a curly line on the bottom. It is not a straight…...
Calculus
The Algebraic Intricacies of Dot Products
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Warm up ' A first warm-up question involves the algebra of dot products. The dot product of the vector 2v with the vector 2w, when compared with y times w, is equal to..? There are two choices: one is to multiply V 2 times v dot w, or is it 4 times V dot w? (2v->)*(2w->)=2(v->*w->) or 4(v->*w->) The question remains. Which one is true? The dot product of 2v with 2w is 2w1 comma 2w2 times w2. What happens…...
Calculus
Partial Derivatives and the Gradient. Gradient and Theorem
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Partial derivatives and the gradient. Gradient and theorem Here's the first cool property of a gradient: The gradient vector is perpendicular to the level surface corresponding to setting the function w equal to a constant. ∇w I level surface w ={constant} If we draw a contour plot of my function, then we will have a two-variable function with level curves representing the gradient at each point. If we then draw the gradient vector at each point on that contour plot,…...
Calculus
Matrices and Rotation. Matrix Multiplication
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Matrices and Rotation. Matrix Multiplication Let's begin by discussing matrices. You should remember how to multiply a matrix times a vector. If we have a matrix, say a, b, c, d (or these could be numbers) and multiply it by a vector v, v1, v2 (or these could be numbers), what do we get then? A new vector. For the top component, we multiply times v1 by a plus b times v2. Somehow, if you put my fingers like this,…...
Calculus
Exploring the Definition of Derivative: Example Problem and Tangent Line Slope
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Definition of Derivative. Example Problem 2 Use the definition of derivative to find f' (x) of the function: f(x)=3x^2 -4 Let's use the definition of a derivative to find the derivative of the function f where f(x) = 3x2 - 4. The derivative of a function f(x) is defined as the limit of the difference quotient as h approaches zero. C| If you recall, the derivative of a function f(x) is defined as lim h-+0 f(x + h) - f(x)…...
Calculus
Warm up 2
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Warm up 2 Now, here is a question for you regarding the geometry of dot products, regarding kind of visualizing what dot products mean. Suppose I have a vector v over here and then I have vector u over here. And if I extend u as a straight line, I can extend it until it makes a right angle with this vector. This would be like making a right triangle here. Then I have another vector that goes in the…...
Calculus
Implication: Understanding the Conditional Truth in Mathematics
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Implication Implication in Mathematical Thinking is the idea of "if...then". This can be seen in many different ways. For example, if you add two numbers together, then the sum will always be bigger than or equal to either of the original numbers. If a person is taller than someone else, then they are also older than them (unless of course they are twins!). Another way this can be seen is if there is a solution to an equation, then it…...
Mathematics
Linear Relations and Matrix Multiplication
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What Are Matrices? A matrix is a rectangular array of numbers or other data. In mathematics, it is a rectangular array of numbers whose elements are indexed by non-negative integers. Although the term "matrix" can refer to diverse mathematical objects, its most familiar meaning is that of an n-by-n table filled with elements whose ith entry is denoted by aij. So maybe you have had a little exposure to matrices in high school, but if you haven't, here is just…...
Calculus
The Power of Equivalence: Unraveling Logical Connections
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Equivalence Implication and equivalence are two types of logic statements that can be used to express conditional or logical relationships between two propositions. Implication An implication is a statement that says that if one thing is true, then another thing must be true as well. It is written in the form: “If A, then B.”For example: If it rains, then the ground will be wet. In this statement the subject (it) refers to an event (rains). The predicate (wet) describes…...
Mathematics
Finding Limits Analytically. Example Problem 2
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Finding Limits Analytically. Example Problem 2 Find: lim_(x->3) (sqrt(2x+10-4))/x-3 * (sqrt(2x+10+4))/(sqrt(2x+10+4)) lim_(x->3) (2x+10-16)/((x-3)(sqrt(2x+10+4))) lim_(x->3) 2x-6/(x-3)(sqrt(2x+10+4)) lim_(x->3) 2/(sqrt(2x+10+4))=2/8=1/4 Another algebraic technique we can use to clear up limits of indeterminate forms, 0/0, is to rationalize the denominator. Clearly, factoring the denominator is not going to work here. The square root of a negative number is also a negative number and therefore cannot be factored. Since we cannot factor the denominator, we must rationalize it. To rationalize a fraction, we multiply both…...
Calculus
Level Curves and Partial Derivatives. Computing Partial Derivatives
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Level curves and partial derivatives. Computing partial derivatives There is a notation used in physics and applied math that allows one to compute these things. So how to compute? How to compute? to find δf/δx=f_x? treat y as constant x as variable Ex: f(x, y)=x^3 y+y^2; δf/δx=3x^2 y+0 δf/δy=x^3 +2y In Mathematics, the same symbol may be used for both a variable and one of its derivatives. For example, f(x) is the derivative of f(x), where y is treated as…...
Calculus
Equations of Lines and Normal Vectors
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Equations of lines and normal vectors We use numbers now, but you can substitute any letter for each variable. If you have ax plus by plus c, the same story applies. By the same reasoning, if the line ax + by + c = 0, then the vector (a, b) is perpendicular to the line. ax + by + c = 0 That's it. Can zero be replaced with any number? Or, can it be like ax plus by plus…...
Calculus
Functions of 3 Variables. Linear Approximation
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Functions of 3 variables. Linear approximation Suppose we want to find the tangent plane to the surface whose equation is x2+y2-z2=4 at the point (2, 1, 1). find the tangent plane to surface x^2+y^2-z^2=4 at 7. 1, 1 )? A way to do this is to solve for z in the equation z = f(x, y); once that is done, we can write z as a function of x and y. then find a tangent plane approximation of the graph…...
Calculus
Particle Motion. Example Problem 2
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Particle Motion. Example Problem 2 An object moves along the y-axis such that its position is given by y(†) = t^3 - 12t^2 + 21t - 3 at what time does the object change direction? v(t)=0 y'(t)=3t^2-24t+21=0 t^2-8t+7=0 (t-1)(t-7)=0 t=1, 7 Given an object moving on the y-axis, its position is described by this equation. At what time does the object change direction? I believe you will find that the concepts of position, velocity, and acceleration-as they relate to particles--are…...
Calculus
Linear Approximation and Perpendicular Vectors
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Linear approximation You already know about about functions of several variables and linear approximation Also, you are familiar with vectors. Now we'll unite those concepts. Let's review linear approximation. Here is some complicated function, fof (x,y). F(x,y) The function is complicated, but if we take a little box in the xy- plane, then inside of this box the function is well approximated by something way less difficult. It is almost equal to an expression of the form ax + by…...
Calculus
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