Pentagon ABCDE is translated using the translation rule T(3, –4).The coordinates of A’ will be (_____).
The coordinates of C’ will be (_____).
Answers
Answer:
A will be (2,0) and C will be (-2,-2)
Step-by-step explanation:
I took the assignment.
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Which numbers are a distance of 5 units from 3 on the number line?Write your answer : ___ and ___
Answers
The length of the other leg of a right angle triangle is, 10.95 units
What is mean by Triangle?
A triangle is a three sided polygon, which has three vertices and three angles which has the sum 180 degrees.
Given that;
A right angle triangle has a hypotenuse of length 13 units and a leg of length 7 units.
Now, By the Pythagoras theorem, we get;
⇒ Hypotenuse² = Perpendicular² + Base²
⇒ 13² = 7² + Base²
⇒ 169 = 49 + Base²
⇒ Base² = 169 - 49
⇒ Base² = 120
⇒ Base = √120
⇒ Base = 10.95 units
Learn more about the triangle visit;
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(7)² + B² = 13²;
49 + B² = 169;
B² = 130;
B = 11.40
The length of the other leg is 11.40.
Answers
=$5.544
Answers
This is the equation you would use
Answers
we need to find m - gradient and c - intercept of the graph
since we have been given 2 points we know the x and y coordinates of these 2 points
point A , x = 0 and y = -4
point B , x = 6 and y = 2
substituting these x and y values in y = mx + c form
-4 = m*0 + c
-4 = c
then intercept is -4
substituting x and y in point B
2 = m * 6 + c
since c = -4
2 = 6m - 4
6m = 6
m = 1
since we know m=1 and c = -4
the equation for line AB is
y = 1*x - 4
y = x - 4
Answer: the answer is y + 4 = x
B.b= 4 2/7
C. b = 8 2/7
D. b = 8 4/7
Answers
b=6 1/7 + 2 3/7
==>b=(6+2)+(1/7+3/7)
==>b=8 4/7
Answer D
Identify the center and radius of the circle.
Group of answer choices
Center: left parenthesis 2 comma 3 right parenthesis
Radius: 20
Center: left parenthesis 4 comma minus 6 right parenthesis
Radius: 2 square root of 5
Center: left parenthesis negative 4 comma 6 right parenthesis
Radius: 20
Center: left parenthesis 2 comma 3 right parenthesis
Radius: 2 square root of 5
Answers
Given:
The equation of the circle is
We need to determine the center and radius of the circle.
Center:
The general form of the equation of the circle is
where (h,k) is the center of the circle and r is the radius.
Let us compare the general form of the equation of the circle with the given equation to determine the center.
The given equation can be written as,
Comparing the two equations, we get;
(h,k) = (0,-4)
Therefore, the center of the circle is (0,-4)
Radius:
Let us compare the general form of the equation of the circle with the given equation to determine the radius.
Hence, the given equation can be written as,
Comparing the two equation, we get;
Thus, the radius of the circle is 8