Applying basic integration rules:

Cards (75)

The most general form of an antiderivative includes a constant of integration
The antiderivative of $x^{n}$ includes the term $\frac{x^{n + 1}}{n + 1}$ , where $n$ cannot equal -1
The antiderivative of $\cos(x)$ is $\sin(x) +$ $C$ . 
True
The power rule of integration applies only to integer values of $n$ . 
False
The antiderivative of $5x^{2}$ is \frac{5x^{3}}{3} + C
Steps to find the antiderivative of $x^{3}$  
1️⃣ Increase exponent by 1: $3 +$ $1 =$ $4$
2️⃣ Divide by new exponent: $\frac{x^{4}}{4}$
3️⃣ Add the constant of integration: $\frac{x^{4}}{4} +$ $C$
Steps to find the antiderivative of $5x^{2}$  
1️⃣ Increase the exponent by 1: $2 +$ $1 =$ $3$
2️⃣ Divide by the new exponent: $\frac{x^{3}}{3}$
3️⃣ Multiply by the constant 5: $\frac{5x^{3}}{3}$
4️⃣ Add the constant of integration: $\frac{5x^{3}}{3} +$ $C$
The Constant Multiple Rule includes a constant of integration because the derivative of any constant is zero.
The Difference Rule states that $\int [f(x) - g(x)] \, dx =$ $\int f(x) \, dx - \int g(x) \, dx +$ $C$ , where $C$ is the constant of integration.
The most general form of an antiderivative includes a constant of integration because the derivative of any constant is zero.
True
An antiderivative of a function $f(x)$ is a function $F(x)$ such that $F'(x) =$ $f(x)$ . The most general form of an antiderivative includes a constant of integration
In the power rule of integration, $n$ can be any real number except -1
The antiderivative of $\sqrt{x}$ is $\frac{2x^{3 / 2}}{3} +$ $C$ because $\sqrt{x}$ can be written as $x^{1 / 2}$ and $\frac{1}{2} +$ $1 =$ $\frac{3}{2}$ .exponent
The antiderivative of $5x^{2}$ is $\frac{5x^{3}}{3} +$ $C$ . 
True
The constant multiple rule of integration states that $\int k \cdot f(x) \, dx =$ $k \cdot \int f(x) \, dx +$ $< blank_{s}tart > C < blank_{e}nd > < distractors > \frac{1}{k} ||| k ||| 0 < / distractors > < cloze_{e}nd > < truefalse_{s}tart > < line > 65 < / line > < statement_{s}tart > The constant multiple rule requires adding the constant of integration after multiplying by < latex > k$ .<statement_end><answer_start>True<answer_end><truefalse_end>

<cloze_start>The sum rule of integration states that \int [f(x) + g(x)] \, dx = \int f(x) \, dx + \int g(x) \, dx + C
The Sum Rule of integration states that the antiderivative of the sum of two functions is the sum of their antiderivatives. 
True
What is the antiderivative of 3x^2 - sin(x)?
x^3 + cos(x) + C
The constant of integration is added because the derivative of any constant is zero. 
True
What is the antiderivative of $\sin(x)$ ? 
$- \cos(x) +$ $C$
If $f(x) =$ $2x$ , what is its antiderivative $F(x)$ ? 
$x^{2} +$ $C$
What is the antiderivative of $x^{3}$ ? 
$\frac{x^{4}}{4} +$ $C$
To find the antiderivative of $5x^{2}$ , we first apply the power rule to $x^{2}$ . 
True
The power rule of integration applies to $x^{n}$ where $n$ can be any real number. 
False
Match the function with its antiderivative:
$x^{3}$ ↔️ $\frac{x^{4}}{4} +$ $C$
$\sqrt{x}$ ↔️ $\frac{2x^{3 / 2}}{3} +$ $C$
$\frac{1}{x^{2}}$ ↔️ $- \frac{1}{x} +$ $C$
Match the function with its antiderivative using the Constant Multiple Rule:
$3x^{2}$ ↔️ $x^{3} +$ $C$
$- 2\sin(x)$ ↔️ $- 2\cos(x) +$ $C$
Steps to find the antiderivative of 3x^{2} - \sin(x)</latex>
1️⃣ Apply the Difference Rule: $\int [3x^{2} - \sin(x)] \, dx =$ $\int 3x^{2} \, dx - \int \sin(x) \, dx +$ $C$
2️⃣ Find the antiderivative of $3x^{2}$ : $x^{3} +$ $C_{1}$
3️⃣ Find the antiderivative of $\sin(x)$ : $- \cos(x) +$ $C_{2}$
4️⃣ Combine the results: $x^{3} +$ $\cos(x) +$ $C$
What is the antiderivative of $3x^{2} - \sin(x)$ ? 
$x^{3} +$ $\cos(x) +$ $C$
What is the purpose of the constant of integration $C$ in antiderivatives? 
Derivative of any constant is zero
What is the antiderivative of $x^{3}$ using the power rule? 
$\frac{x^{4}}{4} +$ $C$
Steps to apply the power rule of integration to x^{n}</latex>:
1️⃣ Increase the exponent by 1
2️⃣ Divide by the new exponent
3️⃣ Add the constant of integration $C$
The power rule of integration states that the antiderivative of $x^{n}$ is \frac{x^{n + 1}}{n + 1}
The difference rule of integration involves subtracting the antiderivatives of two functions.
True
The antiderivative of 5 is 5x + C
What is the formula for the Sum Rule of integration?
$\int [f(x) +$ $g(x)] \, dx =$ $\int f(x) \, dx +$ $\int g(x) \, dx +$ $C$
Steps to find the antiderivative of 3x^2 - sin(x) using the Difference Rule
1️⃣ Apply the Difference Rule to split the integral
2️⃣ Apply the Constant Multiple Rule and Power Rule to 3x^2
3️⃣ Find the antiderivative of sin(x)
4️⃣ Combine the antiderivatives and add C
The simplified antiderivative of x^2 - 4x + 5 is \frac{x^{3}}{3} - 2x^{2} + 5x + C
When rewritten in power form, $\sqrt{x} +$ $\frac{1}{x^{3}}$ becomes x^{1 / 2} + x^{ - 3}
What is the antiderivative of $f(x) =$ $5$ ? 
5x + C
The antiderivative of a constant function $f(x) =$ $k$ is a linear function of the form $F(x) =$ $kx +$ $C$ .
Steps to find the antiderivative of $f(x) =$ $5$  
1️⃣ Apply the power rule: $\int 5 \, dx =$ $5 \int x^{0} \, dx$
2️⃣ Increase the exponent by 1: $0 +$ $1 =$ $1$
3️⃣ Divide by the new exponent: $\frac{5x}{1} =$ $5x$
4️⃣ Add the constant of integration: $5x +$ $C$