Reflect a triangle whose vertices are ?(2, 3), ?(6, 3) and ?(4,
8) about the line...
Reflect a triangle whose vertices are ?(2, 3), ?(6, 3) and ?(4,
8) about the line ? = 3? + 4. Determine the final coordinates of
the triangle. Sketch the initial and final positions
Using the same data… 2 3 4 4 4 6 6 6 7 8 8 9 10 10 11 12 16 16
28 46 (d) [5 pts] Determine the 5# summary. (e) Determine the lower
and upper fence to determine if there are any outliers. (f) Draw
and carefully label a modified boxplot for this data. (g) What is
the shape of the distribution (symmetric, skewed left, or skewed
right). Explain.
A particle moves once counterclockwise about the triangle with
vertices (0, 0), (4, 0) and (1, 6), under the influence of the
force F=xyi+xj. Calculate the work done by this force.
9). 3 charges, 8 µC each, are located on three vertices A, B, C of an equilateral triangle with sides 1 cm each. Another charge q is located at the mid point D of the side BC. Calculate q in micro Coulomb so that net force on the charge at A due to the charges at B, C and D is zero.
10). In a right angle triangle ABC, angle ABC is 90 Degree, AB = 2 m, and...
Part 1. Describe the boundaries of the triangle with vertices
(0, 0), (2, 0), and (2, 6). (a) Describe the boundary with the top
function, bottom function, left point, and right point. (b)
Describe the boundary with the left function, right function,
bottom point, and top point.
Part 2. Consider the triangle with vertices (0, 0), (3, 0) and
(6, 6). This triangle can be described using only one of the two
perspectives presented above: top-bottom or left-right. Explain
which...
tens
Units
1
5
2
3
4
8
5
2 5 6 9
6
1 3 5 4 7 9
7
0 0 4 5 6 9 9
8
1 3 5 6 8 9
9
0 1 2 3 5 9
The table represent a random sample of 31 test scores taken from
a large lecture class. Find the following [round to 2 decimal
points X. XX]
a) [2 pts] Find the 5 number summary [L, Q1, Q2, Q3,...
Let G be a graph whose vertices are the integers 1
through 8, and let the adjacent vertices of each vertex be given by
the table below:
vertex
adjacent vertices
1
(2, 3, 4)
2
(1, 3, 4)
3
(1, 2, 4)
4
(1, 2, 3, 6)
5
(6, 7, 8)
6
(4, 5, 7)
7
(5, 6, 8)
8
(5, 7)
Assume that, in a traversal of G, the adjacent vertices
of a given vertex are returned in the...