Mathematics Stack Exchange
Mathematics Stack Exchange

Questions tagged [substitution]

Questions that involve a replacement of variable(s) in an expression or a formula.

In mathematics, the operation of substitution consists in replacing all the occurrences of a free variable appearing in an expression or a formula by a number or another expression. In other words, an expression involving free variables may be considered as defining a function, and substituting values to the variables in the expression is equivalent to applying the function defined by the expression to these values. A change of variables is commonly a particular type of substitution, where the substituted values are expressions that depend on other variables. This is a standard technique used to reduce a difficult problem to a simpler one. A change of coordinates is a common type of change of variables. However, if the expression in which the variables are changed involves derivatives or integrals, the change of variable does not reduce to a substitution.

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Why doesn't substiuting work here?

I know that:$$\int \cos x dx = \sin x +C$$ Substiute $x$ for $ax+b$: $$\int \cos(ax+b) dx = \sin(ax+b) +C$$ but according to my book: $$\int \cos(ax+b) dx = \frac{1}{a}\sin(ax+b) +C$$ Why doesn't substiuting work here?
BadUsername
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Why does the trigonometric substitution x = a*sec(u) hold for any x, given a is a constant?

I know this is a basic substitution question but I haven't been able to figure it out. I often use trigonometric substitutions for integrands involving expressions such as $a^2-x^2$ and others. I have learnt to solve these by using the substitution,…
Henry_
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Explanation of substitution in integral equation

Let $f$ be a function that is 0 everywhere except in the interval $(0,1)$. Let $$ P_n(x)=\int_{-1}^1 f(x+t) Q_n(t) dt $$ and $0\leq x\leq 1$. Can someone explain me this substitution, somehow i don't get it: $$ P_n(x)=\int_{-x}^{1-x} f(x+t) Q_n(t)…
calculatormathematical
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Doubt in Bruce Berndt and Armin Straub's paper

Here on page $6$ and $7$, Bruce Berndt and Armin Straub show that $$ (- \beta)^{-m}\,\sum_{n = 1}^{\infty}\dfrac{\coth(\beta n)}{n^{2m + 1}} - \alpha^{-m}\,\sum_{n = 1}^{\infty}\dfrac{\coth(\alpha n)}{n^{2m + 1}}$$ $$ = 2^{2m}\,\sum_{k = 0}^{m +…
BooleanCoder
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Change of variables in differential equation?

I have the following formula: $$f(x) = \frac{d^2w(x)}{dx^2}$$ Now I would like to normalize $x$ by dividing it by $L$? This would be the substitution: $$\hat{x}=x/L$$ How would my formula change? (step by step please)
james
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Derivates with trigonometric substitution

In this integral how do they get $$dx=2\sec^2\theta \ d\theta$$ Here is the integral: $$\int\frac{dx}{x^2\sqrt{x^2+4}}=\int\frac{2\sec^2d\theta}{\mathrm{4\tan^2\ \theta}\!\cdot\!\mathrm{2\sec\ \theta}}=\frac{1}{4}\int\frac{sec\ \theta}{tan^2\…
Jinzu
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Solving this question regarding wagons, I dont know what method to use

Mark has opened a store and is selling wagons. He has a capital of 416 000 dollars that he can use to purchase 2 different type of wagons. Model A has a purchase price of 2400 dollars and a profit at sale of 1000 dollars. Model B has a purchase…
J. Doe
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Expressing surds in different forms

I know this might get taken down for being a dumb question but I'm not exactly a genius when it comes to maths. So the question is I need to express 6/√2 in the form of a√b and a and b both need to be positive integers. Help me please.
Pingas Machine
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how to verify asymptotic upper bound ( substitution method) $T(n)= 4T(n/2 +2)+n$

i guess $O(n^2)$ and $T(n)= 4C(n/2+2)^2 - C(n/2+2) +n$ ...(??) $\leq C(n^2)$ is this right? and how can i verify this problem using the substitution method... help me
user273346
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How do you use substitution to make another variable the subject?

I've been trying to solve this question but have no idea how to do it, as we've never covered it before. "Rewrite the following equation in terms of the new variable" $$x^2-3x+5=0, y=x-2$$ The goal is to get an equation in the style of $ay^2+by+c=0$
Mimir2902
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Optimization Problem using direct substitution

Minimize the function $$ Z = \frac{1}{2}x_1² + x_2² +x_3²$$ subject to $$x_1 - x_2 = 0$$ and $$x_1 + x_2 +x_3 =1$$
Cookey Cookey
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Substituting angular momentum equation to the equation of motion

I'm having a equation $\dfrac{d}{dt}=\dfrac{l}{mr^2}\dfrac{d}{d\varphi}$ which I'm supposed to substitute into $m\ddot{r}-\dfrac{l^{2}}{m r^{3}}=f(r)$ and have a differential equation…
Matti Hokkanen
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Nasty algebra substitution problem

From this PhD dissertation, page 29: Reduce the formula $$ T(0, t) = T_{eq} + \frac{(1 − A)}{(1+i)\sqrt{\pi fKC\rho} + 4\epsilon\sigma T^{4}_{eq}}\epsilon_{1}e^{i2\pi ft} $$ down to $$ T(0, t) = T_{eq} + \frac{(1 − A)}{4\epsilon\sigma…
sunra
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Writing $w_b$ in terms of $w_a$

Blanking out on this.. if I have $w_a = \sqrt{\frac km}$ and $w_b = \sqrt{\frac k{2m}}$, how can i rewrite $w_b$ in terms of $w_a$? Would it just be $\frac1{\sqrt2}\sqrt{\frac km}$?
HokieFan7
  • 29
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How to substitute the give formula to $ x = \frac{y+z}{1+yz/m^2}$

How to solve for x from$$ \frac{1}{\sqrt{1-x^2/m^2}}=\frac{1}{\sqrt{1-y^2/m^2}} \cdot\frac{1}{\sqrt{1-z^2/m^2}}\cdot(1+\dfrac{yz}{m^2}) $$ to $$ x = \frac{y+z}{1+yz/m^2}$$ There is also a tip, which…
epzylVan
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