6.

In which quadrant is the point (x, y) located if x is negative and y is positive? (1 point)

II
III
IV
I

At the halftime show, a marching band marched in formation. The lead drummer started at a point with coordinates (–2, –5) and moved 3 steps up and 1 step right.

a. Write a rule to describe the translation.
b. What were the coordinates of the drummer's final position?

Point E is located at (–2, 2) and point F is located at (4, –6). What is the distance between points E and F? (1 point)

square root of fifty-two
square root of twenty-eight
10
square root of twenty

Can u help please I don't know how to do them can u explain how to do them please thx

i'm in the 6th grade and i know the answere to that!!

c

d
a
c
b
II
a
b
this is for part 1 ill post part 2 soon

II for first question idk about else

Sure, I can help explain how to solve these questions.

1. In which quadrant is the point (x, y) located if x is negative and y is positive?

To determine the quadrant, we need to understand the signs of x and y. In this case, x is negative and y is positive, which means the point lies in the second quadrant (II). The second quadrant is where x is negative and y is positive.

2. At the halftime show, a marching band marched in formation. The lead drummer started at a point with coordinates (-2, -5) and moved 3 steps up and 1 step right.

a. Write a rule to describe the translation.

To describe the translation, we need to consider the movement in terms of coordinates. In this case, the drummer moved 3 steps up and 1 step right. So the rule for the translation can be written as (x, y) -> (x + 1, y + 3). This means that the x-coordinate increases by 1 and the y-coordinate increases by 3.

b. What were the coordinates of the drummer's final position?

To find the final position, we need to apply the translation rule to the initial position. Starting at (-2, -5), we add 1 to the x-coordinate and 3 to the y-coordinate. So the final position of the drummer is (-2 + 1, -5 + 3), which simplifies to (-1, -2).

3. Point E is located at (-2, 2) and point F is located at (4, -6). What is the distance between points E and F?

To find the distance between two points, we can use the distance formula: d = sqrt((x2 - x1)^2 + (y2 - y1)^2), where (x1, y1) and (x2, y2) are the coordinates of two points.

In this case, the coordinates of point E are (-2, 2) and the coordinates of point F are (4, -6). Plugging these values into the distance formula, we have:
d = sqrt((4 - (-2))^2 + (-6 - 2)^2)
= sqrt(6^2 + (-8)^2)
= sqrt(36 + 64)
= sqrt(100)
= 10

Therefore, the distance between points E and F is 10.

I hope this explanation helps you understand how to solve these questions. If you have any further questions, feel free to ask!

6; IV

7; not sure
8; 10