All Calculus 1 Resources
Example Questions
Example Question #1 : Equations
What is the area under the curve for ?
By normal exponent rules , and so we set up the definite integral
,
which integrates to:
Example Question #1 : Equations
The Gaussian integral formula states that
.
What is the integral of
?
Integrating by parts with
,
, ,
we get:
Example Question #2 : Equations
Determine given that .
This problem requires you to evaluate an indefinite integral of the given function f’(x). Integrating each term of the function with respect to x, we simply divide each coefficient by (n+1), where n is the value of the exponent on x for that particular term, and then add 1 to the value of the exponent on each x. This gives us:
A correct answer must include a constant C, as the original function may have had a constant that is not reflected in the equation for its derivative.
Example Question #3 : Equations
What is the value of the following definite integral?
We start by integrating the function in parentheses with respect to x, and we then subtract the evaluation of the lower limit from the evaluation of the upper limit:
Example Question #4 : Equations
Determine the amount of work required to push a box from meters to meters, given the function for force below:
This problem intends to demonstrate one possible application of calculus to the field of physics. An equation for work as given in physics is as follows:
Using this equation, we simply set up a definite integral with our bounds given by the interval of interest in the problem:
Joules
After evaluating our integral, we can see that the work required to push the box from x=2 meters to x=5 meters is 39.8 Joules.
Example Question #4 : How To Find Integral Expressions
Evaluate the definite integral within the interval .
In order to solve this problem we must know that
In this case we have:
Our first step is to integrate:
We then arrive to our solution by plugging in our values
Example Question #3 : Equations
Write out the expression of the area under the following curve from to .
Simply use an integral expression with the given x values as your bounds.
Don't forget to add the dx!
Example Question #6 : How To Find Integral Expressions
Evaluate the definite integral within the interval .
In order to solve this problem we must remember that:
In this case we have:
Our first step is to integrate:
We then arrive at our solution by plugging in our values
Example Question #5 : Equations
Evaluate the definite integral within the interval
In order to solve this problem we must remember that:
In this case we have:
Our first step is to integrate:
We then arrive to our solution by plugging in our values
Example Question #6 : Equations
Evaluate the indefinite integral.
We are being asked to integrate the function.
To do this we need to remember the power rule of integrals,
Using this rule, we can evaluate the following integral:
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