All Calculus 2 Resources
Example Questions
Example Question #15 : Parametric Form
Given and , what is in terms of (rectangular form)?
None of the above
We know that and , so we can solve both equations for :
Since both equations equal , we can set them equal to each other and solve for :
Example Question #21 : Parametric, Polar, And Vector
Given and , what is in terms of (rectangular form)?
None of the above.
We know and , so we can solve both equations for :
Since both equations equal , let's set both equations equal to each other and solve for :
Example Question #23 : Parametric
Given and , what is in terms of (rectangular form)?
None of the above.
We know and , so we can solve both equations for :
Since both equations equal , let's set both equations equal to each other and solve for :
Example Question #22 : Parametric, Polar, And Vector
Given and , what is in terms of (rectangular form)?
None of the above.
We know and , so we can solve both equations for :
Since both equations equal , let's set both equations equal to each other and solve for :
Example Question #23 : Parametric, Polar, And Vector
Convert the following parametric function into rectangular coordinates:
To eliminate the parameter, we can solve for t in terms of y easiest:
Next, substitute all of the t's in the equation for x with what we defined above:
To finish, subtract 3, multiply by 4 and take the square root of both sides. We need plus or minus because both positive and negative squared give a positive result.
Example Question #21 : Parametric
If and , what is in terms of (rectangular form)?
None of the above
Given and , we can find the rectangular form by solving both equations for :
Since both equations equal , we can set them equal to each other:
Example Question #22 : Parametric, Polar, And Vector
If and , what is in terms of (rectangular form)?
None of the above
Given and , we can find the rectangular form by solving both equations for :
Since both equations equal , we can set them equal to each other:
Example Question #23 : Parametric, Polar, And Vector
If and , what is in terms of (rectangular form)?
None of the above
Given and , we can find the rectangular form by solving both equations for :
Since both equations equal , we can set them equal to each other:
Example Question #26 : Parametric, Polar, And Vector
Given and , what is in terms of (rectangular form)?
None of the above
Since we have and , let's solve each equation for :
Since both equations equal , we can set them equal to each other and solve for :
Example Question #24 : Parametric, Polar, And Vector
Given and , what is in terms of (rectangular form)?
None of the above
Since we have and , let's solve each equation for :
Since both equations equal , we can set them equal to each other and solve for :
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