The coordinate grid shows four locations each unit on the grid represents 1 city block. Jerimiah walks twice around the rectangular path connecting the four locations how many city blocks does Jerimiah walk
Without a picture or specific locations, it is difficult to give an exact answer. However, we can make a rough estimate based on a rectangular path connecting four locations on a coordinate grid.
If the rectangular path is just a simple rectangle connecting the four corners of the grid, then the length and width of the rectangle would each be the same as the number of units on the grid. For example, if the grid is 5 units by 7 units, then the rectangular path would be a rectangle with a length of 7 units and a width of 5 units.
To find the distance Jerimiah walks, we can add up the lengths of all four sides of the rectangular path and then multiply by 2 (since he walks around twice). Using the example above, the distance would be:
(7 + 5 + 7 + 5) x 2 = 48
So Jerimiah would walk 48 city blocks. Again, this is just an estimate without specific information about the locations and path.
there are only 22 44 56 36
Without more details about how these numbers relate to the question, it is not possible to provide an accurate answer. Please provide more context and information so that I can assist you better.
those are the only answers
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what best describes the triangle with a 80 degree a 50 degree and another 50 degree and 6 in then another 6 in then a 7.7 in
Based on the information given, we know that the triangle has two angles that are equal (both 50 degrees) and one angle that is 80 degrees. This means that the triangle is not equilateral, since all the angles in an equilateral triangle are equal.
Since we know the lengths of two sides (6 in and 6 in) and one angle (80 degrees), we can use the Law of Cosines to find the length of the third side. Let's call this length "c".
c^2 = 6^2 + 6^2 - 2*6*6*cos(80)
c^2 = 36 + 36 - 72*cos(80)
c^2 = 72 - 36*cos(80)
c = sqrt(72 - 36*cos(80))
Using a calculator, we can find that c is approximately 7.91 in.
Therefore, the triangle has side lengths of 6 in, 6 in, and 7.91 in, and angles of 80 degrees, 50 degrees, and 50 degrees. Based on these measurements, we can conclude that the triangle is a scalene triangle, meaning that all three sides have different lengths.
so is that a right and isosceles or an obtuse and isosceles or an acute and isosceles or an acute and scalene
The triangle described is an acute and scalene triangle.
We know it is not a right triangle because none of the angles measure 90 degrees.
It is not an obtuse triangle either, since all its angles are acute or less than 90 degrees.
Finally, while it is isosceles (meaning two sides are equal), it is not strictly classified as such since its third side is not equal to the other two. So the best classification for this triangle is an acute and scalene triangle.