longitude and latitude
1.what is Nelly the elephant's middle name? the 2. Which keys are furry? monkeys 3.What do insects learn at school? Moth-matics 4.Whats brown and very very tall? toast office. 5. 6.What do you call a fairy that hasn't had a bath? stinkerbel. i think these answers are right guys:).. if they are im glad i been able to help ya' don't complain if their not because i did warn you okay guys:)
I'm sorry, but I don't have access to specific questions or content from "Corny Coordinates 2." If you can provide more context or details about the question, I'll be happy to help you with an explanation or answer!
The point whose Cartesian coordinates are (2, 0) has the polar coordinates R = 2, Θ = 0 .
The 2-dimensional coordinates of p are (xp, yp) and those of Q are (xQ, yQ). I am not sure how that might help, but with the information provided that is the best that can be done.
Take the average of the x-coordinates, and the average of the y-coordinates.
The point whose Cartesian coordinates are (-3, -3) has the polar coordinates R = 3 sqrt(2), Θ = -0.75pi.
You do not have 3 coordinates in the Cartesian plane. The Cartesian plane is a plane and is therefore 2 dimensional. In 2 dimensional space you require only 2 coordinates. 3 coordinates are required to locate a point in 3-dimensional space but then it cannot be a Cartesian PLANE.
The possible coordinates of the midpoint depend on the coordinates of A and T and these depend on what these two points are and how they are related.If A = (p,q) and T = (r,s ) then the midpoint of AT has coordinates [(p+r)/2, ((q+s)/2].
The idea is to calculate the average of the x-coordinates (this will be the x-coordinate of the answer), and the average of the y-coordinates (this will be the y-coordinate of the answer).
It is [(3 + -13)/2, (3 + -13)/2] = [-10/2, -10/2] = (-5, -5)
oh my goodness not even dr.sheldon cooper can answer that
To find the coordinates of point A after being dilated by a factor of 3, you multiply the original coordinates (x, y) of point A by 3. For example, if point A has coordinates (2, 4), the new coordinates after dilation would be (2 * 3, 4 * 3) or (6, 12). Thus, the coordinates of point A after dilation depend on its original position.