All categories

3 years ago

True or false a survey is the only way to collect date

Mathematics

2 answers:

Digiron [165]3 years ago

7 0

Answer:

False and also the last word is data not date.

Step-by-step explanation:

umka21 [38]3 years ago

5 0

Answer:

false

Step-by-step explanation:

You might be interested in

An irrigation system (sprinkler) has a parabolic pattern. The height, in feet, of the spray of water is given by the equation ℎ(

maw [93]

The irrigation system is positioned 9.5 feet above the ground to start.
The spray reaches a maximum height of <u>84.5 feet</u> at a horizontal distance of <u>5 feet</u> away from the sprinkler head.
The spray reaches all the way to the ground at about 10.87 feet away

<h3>How to determine the position?</h3>

Since the height (feet) of the spray of water is given by this equation h(x) = -x² + 10x + 9.5, we can logically deduce that the irrigation system is positioned 9.5 feet above the ground to start.

<h3>How to determine the maximum height?</h3>

For any quadratic equation with a parabolic curve, the axis of symmetry is given by:

Xmax = -b/2a

Xmax = -10/2(-1)

Xmax = 5.

Thus, the maximum height on the vertical axis is given by:

h(x) = -x² + 10x + 9.5

h(5) = -(5)² + 10(5) + 9.5

h(5) = -25 + 50 + 9.5

h(5) = 34.5 feet.

Therefore, the spray reaches a maximum height of <u>84.5 feet</u> at a horizontal distance of <u>5 feet</u> away from the sprinkler head.

Also, the spray reaches all the way to the ground at about:

Maximum distance = √34.5 + 5

Maximum distance = 10.87 feet.

Read more on maximum height here: brainly.com/question/24288300

#SPJ1

<u>Complete Question:</u>

An irrigation system (sprinkler) has a parabolic pattern. The height, in feet, of the spray of water is given by the equation h(x) = -x² + 10x + 9.5, where x is the number of feet away from the sprinkler head (along the ground) the spray is.

1. The irrigation system is positioned____ feet above the ground to start.

2. The spray reaches a maximum height of ____feet at a horizontal distance of feet away from the sprinkler head.

3. The spray reaches all the way to the ground at about_____ feet away

8 0

2 years ago

Could y’all help with the answer?

sweet-ann [11.9K]

Answer:

Step-by-step explanation:

5 x 6 = 30

6 x 6 = 36

8 x 6 = 48

3 0

2 years ago

Read 2 more answers

Simplify this (2x)^{3}

Margaret [11]

Answer:

8x^3

Step-by-step explanation:

(2x)3

=(2x)3

=2x*2x*2x

=8x^3

7 0

2 years ago

Simplify the rational expression. State any restrictions on the variable n^4-11n^2+30/ n^4-7n^2+10

djyliett [7]

To factor both numerator and denominator in this rational expression we are going to substitute $n^{2}$ with $x$ ; so $n^{2} =x$ and $n ^{4} = x^{2}$ . This way we can rewrite the expression as follows:
$\frac{n^{4}-11n^{2} +30 }{n^{2}-7n^{2} +10 } = \frac{ x^{2} -11x+30}{ x^{2} -7x+10}$
Now we have two much easier to factor expressions of the form $a x^{2} +bx+c$ . For the numerator we need to find two numbers whose product is $c$ (30) and its sum $b$ (-11); those numbers are -5 and -6. $(-5)(-6)=30$ and $-5-6=-11$ .
Similarly, for the denominator those numbers are -2 and -5. $(-2)(-5)=10$ and $-2-5=-7$ . Now we can factor both numerator and denominator:
$\frac{ x^{2} -11x+30}{ x^{2} -7x+10} = \frac{(x-6)(x-5)}{(x-2)(x-5)}$
Notice that we have $(x-5)$ in both numerator and denominator, so we can cancel those out:
$\frac{x-6}{x-2}$
But remember than $x= n^{2}$ , so lets replace that to get back to our original variable:
$\frac{n^{2}-6 }{n^{2}-2 }$
Last but not least, the denominator of rational expression can't be zero, so the only restriction in the variable is $n^{2} -2 \neq 0$
$n^{2} \neq 2$
$n \neq +or- \sqrt{2}$

5 0

3 years ago

Read 2 more answers

3. What is slope of the line above?<br> 4. What is slope of the line above?<br><br><br> help!

Olin [163]

The answer is

3.) -1/2
4.) 4/3

3 0

3 years ago

True or false a survey is the only way to collect date​

True or false a survey is the only way to collect date