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2 years ago

Order the group of quadratic functions from widest to narrowest graph.

2 answers:

4 0

In a quadratic function, y = a(x²) the smaller the coefficient "a", the larger is the parabola:
From widest to narrowest:

1) y=1/3x² (Widest)

2) y= -1/2x² (Wider)

3) y=-9x² (narrowest)

mote1985 [20]2 years ago

3 0

Answer:

The parabola represented by equation $y=\frac{1}{3}x^2$ is widest

The parabola represented by equation $y=-\frac{1}{2}x^2$ is wider

and the parabola represented by equation $y=-9x^2$ is narrowest

Step-by-step explanation:

we know that equation of parabola is given as,

$y= ax^2$

Here,

a is a constant which decide the size of parabola

if value of a is larger than the parabola will be wider

here

we have given three parabola

$y=-9x^2, y=\frac{1}{3}x^2, y=\frac{-1}{2}x^2$

<u>and it is clear that </u>

$-9$

Therefore

The parabola represented by equation $y=\frac{1}{3}x^2$ is widest

The parabola represented by equation $y=-\frac{1}{2}x^2$ is wider

and the parabola represented by equation $y=-9x^2$ is narrowest

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The quotient of the division 2223÷57 is

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Answer:

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2 years ago

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Regular hexagon ABCDEF is inscribed in circle X and has an apothem that is 6√3 inches long. Use the length of the apothem to cal

TEA [102]

Perimeter is 12*6 =72

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2 years ago

PLS HURRY Point S is translated 5 units to the left and 12 units up to create point S'. Find the distance between point S and po

svet-max [94.6K]

Given:

Point S is translated 5 units to the left and 12 units up to create point S'.

To find:

The distance between the points S and S'.

Solution:

Point S is translated 5 units to the left and 12 units up to create point S'.

The diagram for the given problem is shown below.

From the below figure it is clear that the distance between the point S and S' is the height of a right triangle whose legs are 5 units and 12 units.

By Pythagoras theorem,

$Hypotenuse^2=Perpendicular^2+Base^2$

$SS'^2=(12)^2+(5)^2$

$SS'^2=144+25$

$SS'^2=169$

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$SS'=\sqrt{169}$

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8 0

2 years ago

The probability that a professor arrives on time is 0.8 and the probability that a student arrives on time is 0.6. Assuming thes

saul85 [17]

Answer:

a)0.08 , b)0.4 , C) i)0.84 , ii)0.56

Step-by-step explanation:

Given data

P(A) = professor arrives on time

P(A) = 0.8

P(B) = Student aarive on time

P(B) = 0.6

According to the question A & B are Independent

P(A∩B) = P(A) . P(B)

Therefore

${A}'$ & ${B}'$ is also independent

${A}'$ = 1-0.8 = 0.2

${B}'$ = 1-0.6 = 0.4

part a)

Probability of both student and the professor are late

P(A'∩B') = P(A') . P(B') (only for independent cases)

= 0.2 x 0.4

= 0.08

Part b)

The probability that the student is late given that the professor is on time

$P(\frac{B'}{A})$ = $\frac{P(B'\cap A)}{P(A)}$ = $\frac{0.4\times 0.8}{0.8}$ = 0.4

Part c)

Assume the events are not independent

Given Data

P $(\frac{{A}'}{{B}'})$ = 0.4

= $\frac{P({A}'\cap {B}')}{P({B}')}$ = 0.4

$P$ $({A}'\cap {B}')$ = 0.4 x P $({B}')$

= 0.4 x 0.4 = 0.16

$P({A}'\cap {B}')$ = 0.16

The probability that at least one of them is on time

$P(A\cup B)$ = 1- $P({A}'\cap {B}')$

= 1 - 0.16 = 0.84

ii)The probability that they are both on time

P $(A\cap B)$ = 1 - $P({A}'\cup {B}')$ = 1 - $[P({A}')+P({B}') - P({A}'\cap {B}')]$

= 1 - [0.2+0.4-0.16] = 1-0.44 = 0.56

6 0

2 years ago

Sumalee bought seven Anjou pears for<br> $5.50. How many pears can Stefan buy if<br> he has $22?

Alex17521 [72]

Answer:

Step-by-step explanation:

22 ÷ 5.50 = 4

Hope this helps!

5 0

1 year ago