At an amusement park, the probability that a child eats popcorn and cotton candy is 0.58. The probability that a child eats popcorn is 0.69, and the probability that a child eats cotton candy is 0.87. What is the probability (rounded to the nearest hundredth) that a child eats popcorn given that the child has already eaten cotton candy?0.84
0.67
0.40
0.79

Answers

Answer 1

Answer: the answer to your question is 0.67

Related Questions

What percent of 125 is 24
If you put $150 in a savings account that paid 6% compounded monthly, how much interest would you earn in five years?
Please help asap 25 pts
Which of the following ordered pairs represents a solution to the equation below?y = 3x−2
Round 2.6 to the nearest tenth

What is the domain of y = cos θ

Answers

Answer:

The domain is all real numbers or $x\in(-\infty,\infty)$

Step-by-step explanation:

The definition of domain is :

Domain is the set of x values for which the function is defined.

The given function is y = cos θ and we know that θ can take any value. In other words, for any value of θ, the function y = cos θ is defined.

Therefore, we can conclude that the domain of y = cos θ is the set of all real values.

In interval notation we can write it as

$x\in(-\infty,\infty)$

all real numbers / all x
if you're asking for range as well then its -1<x<1

What are the zeros of the polynomial function f(x) = x3 - 2x2 - 24x?

Answers

The zeroes of the polynomial function are 0, 6, and -4.

Given that,

Polynomial function; $\rm f(x) = x^3-2x^2-24x$ .

We have to determine,

The zeroes of the polynomial,

According to the question,

To determine the zeroes of the given polynomial function following all the steps given below.

Polynomial function; $\rm f(x) = x^3-2x^2-24x$ .

Factorize the polynomial function to find the zeroes of the function,

$\rm x^3-2x^2-24x =0\n\n\rm x(x^2-2x-24)=0\n\nx(x^2-6x+4x-24)=0\n\nx(x(x-6)+4(x-6))=0\n\nx ( (x-6) (x+4)) =0\n\nx (x-6) (x+4) =0$

Therefore,

The zeroes of the polynomial function are,

$\rm x = 0\n\nx - 6 =0, \ \ x =6\n\nx +4 =0, \ \ x = -4$

Hence, The zeroes of the polynomial function are 0, 6, and -4.

For more details refer to the link given below.

brainly.com/question/15849916

first factor out a variable: x(x^2-2x-24)
now solve the quadratic: x(x-6)(x+4)
When you set these expressions equal to zero, you get 0, 6, and -4 as your answers.

Find the equation lines
(4, 5)(7, 3)

Answers

Step-by-step explanation:

Hey there!

The equation of a st.line passing through points (4,5) and (7,3) is;

$(y - y1) = (y2 - y1)/(x2 - x1) (x - x1)$

Putall values.

$(y - 5) = (3 - 5)/(7 - 4) (x - 4)$

Simplifyit.

$(y - 5) = ( - 2)/(3) (x - 4)$

$3(y - 5) = - 2x + 8$

$3y - 15 = - 2x + 8$

$2x + 3y - 23 = 0$

Therefore therequiredequationis2x+3y-23=0.

Hope it helps..

Which comes first domain or range

Answers

they are intertwined the domain is the allowed values of the independent varialbles and the range is the allowed values of the dependent variable.

in order for this to work.range comes first because for example a 100-500 range between the phone cost

Michelle needs to save $7,000 for school in the next two years. She found a bank that offers a 9% interest rate compounded annually. What does she need to deposit at the beginning of the year to have enough money for school?

Answers

$100\%+9\%=109\%=1.09\n\nx*1.09^2=7,000\n\n1.1881x=7,000\ \ \ \ /:1.1881\n\nx\approx5892\n\nAnswer:\$5892$

If slope of AB = slope of BC, then points A,B,C are: A - collinear B - non collinear C - vertices of an right angled triangle D - none of these

Answers

D- none of these
i’m not sure if this is correct

Other Questions

Line AB contains points A (1, 2) and B (−2, 6) The slope of line AB is a)zero b)undefined c)positive d)negative The equation of line CD is (y−3) = − 2 (x − 4). What is the slope of a line perpendicular to line CD? Line CD contains points A (4, 6) and B (−2, 6). The slope of line CD is Line QR contains (2, 8) and (3, 10) Line ST contains points (0, 6) and (−2, 2). Lines QR and ST are The equation of line QR is y = negative 1 over 2x + 1. Write an equation of a line perpendicular to line QR in slope-intercept form that contains point (5, 6). The equation of line CD is y = −2x − 2. Write an equation of a line parallel to line CD in slope-intercept form that contains point (4, 5). Line QR contains (2, 8) and (3, 10) Line ST contains points (0, 6) and (−2, 2). Lines QR and ST are parallel because the product of the slopes is −1 perpendicular because the product of the slopes is −1 parallel because the slopes are the same perpendicular because the slopes are the same Question 2 (06.02 LC) The equation of line CD is (y−3) = − 2 (x − 4). What is the slope of a line perpendicular to line CD? 1 over 2 2 negative 1 over 2 −2 Question 3 (06.02 LC) Line CD contains points A (4, 6) and B (−2, 6). The slope of line CD is zero undefined positive negative Question 4 (06.02 MC) The equation of line QR is y = negative 1 over 2x + 1. Write an equation of a line perpendicular to line QR in slope-intercept form that contains point (5, 6). y = 2x + 16 y = negative 1 over 2x + 17 over 2 y = − 1 over 2x + 7 over 2 y = 2x − 4 Question 5 (06.02 MC) The equation of line CD is y = −2x − 2. Write an equation of a line parallel to line CD in slope-intercept form that contains point (4, 5). y = −2x + 13 y = negative 1 over 2x + 7 y = 1 over 2x + 3 y = − 2x − 3

What is m∠DHG ?[6(x-2)]°

Johnathan ran 5 days this week. The most he ran in one day was 3.5 miles. Write an inequality that shows the distance johnathan could of ran any day this week

What is the vertex of g(x)=8x^2 - 48x + 65?(-3,-7) (3,-7) (24, -7) (-24, -7)