Answers
<EOB = 360- (90+90+58) = 122
<COB = 360 - (90+90+66) = 114
<COE = 360 - (90+90+56) = 124 so arcCE = 124
answer
<DFA = 58
<EOB = 122
<COB = 114
arc CE = 124
Related Questions
The national vaccine information center estimates that 90% of americans have had chickenpox by the time they reach adulthood.50 (a) is the use of the binomial distribution appropriate for calculating the probability that exactly 97 out of 100 randomly sampled american adults had chickenpox during childhood. (b) calculate the probability that exactly 97 out of 100 randomly sampled american adults had chickenpox during childhood. (c) what is the probability that exactly 3 out of a new sample of 100 american adults have not had chickenpox in their childhood? (d) what is the probability that at least 1 out of 10 randomly sampled american adults have had chickenpox? (e) what is the probability that at most 3 out of 10 randomly sampled american adults have not had chickenpox?
Answers
The correct answers are:
A) yes; B) 0.0059; C) 0.0059; D) 1; E) 0.9872.
Explanation:
A) A binomial experiment is one in which the experiment consists of identical trials; each trial results in one of two outcomes, called success and failure; the probability of success remains the same from trial to trial; and the trials are independent.
All of these criteria fit this experiment.
B) The formula for the probability of a binomial experiment is:
[tex] _nC_r\times(p^r)(1-p)^{n-r} [/tex]
where n is the number of trials, r is the number of successes, and p is the probability of success.
In this problem, p = 0.9.
For part B, n = 100 and r = 97:
[tex] _{100}C_{97}(0.9)^{97}(1-0.9)^3
\\=\frac{100!}{97!3!}\times (0.9)^{97}(0.1)^3
\\
\\=161700(0.9)^{0.97}(0.1)^3=0.00589\approx 0.0059 [/tex]
C) We are changing the probability of success this time. Since 90% of people have had chicken pox, then 100%-90% = 1-0.9 = 0.1 have not had chicken pox. For part C, n = 100, r = 3, and p = 0.1:
[tex] _{100}C_3(0.1)^3(1-0.1)^{100-3}
\\
\\=_{100}C_3(0.1)^3(0.9)^{97}
\\=\frac{100!}{97!3!}\times (0.1)^3(0.9)^{97}
\\
\\=161700(0.1)^3(0.9)^{97}=0.00589\approx 0.0059 [/tex]
D) For this part, we want to know the probability that at least 1 person has contracted chicken pox. For this part, p = 0.9, n = 10 and r = 0. We will then subtract this from 1; this will first give us the probability that none of the 10 contracted chicken pox, then subtracting from 1 means that 1 or more people did:
[tex] 1-(_{10}C_0(0.9)^0(1-0.9)^{10-0})
\\
\\=1-(\frac{10!}{0!10!}\times (0.9)^0(0.1)^{10})
\\
\\=1-(1\times 1\times (0.1)^{10})= 1-0 = 1 [/tex]
E) For this part, we find the probability that 3 people, 2 people, 1 person and 0 people have not had chicken pox. The probability p = 0.1; n = 10; and r = 3, 2, 1 and 0, respectively:
[tex] _{10}C_3(0.1)^3(1-0.1)^{10-3}+_{10}C_2(0.1)^2(1-0.1)^{10-2}+
_{10}C_1(0.1)^1(1-0.1)^{10-1}+_{10}C_0(0.1)^0(1-0.1)^{10-0}
\\
\\=_{10}C_3(0.1)^3(0.9)^7+_{10}C_2(0.1)^2(0.9)^8+_{10}C_1(0.1)^1(0.9)^9+
_{10}C_0(0.1)^1(0.9)^{10}
\\
\\120(0.1)^3(0.9)^7+45(0.1)^2(0.9)^8+10(0.1)^1(0.9)^9+1(0.1)^0(0.9)^{10}
\\
\\0.057395628+0.1937102445+0.387420489+0.3486784401
\\
\\=0.9872 [/tex]
The binomial distribution is appropriate for calculating the probability of having a specific number of American adults who had chickenpox during childhood. The probability of exactly 97 out of 100 adults having chickenpox can be calculated using the binomial probability formula. The probability that at least 1 out of 10 adults have had chickenpox and at most 3 out of 10 adults have not had chickenpox can also be calculated using the binomial probability formula.
Explanation:(a) To determine if the use of the binomial distribution is appropriate, we need to check if the conditions for using it are satisfied: (1) There are only two possible outcomes - having or not having chickenpox. (2) Each trial is independent - one person's chickenpox status does not affect another person's. (3) The probability of having chickenpox is the same for each person. The given information satisfies these conditions, so the binomial distribution is appropriate.
(b) The probability of exactly 97 out of 100 randomly sampled American adults having chickenpox during childhood can be calculated using the binomial probability formula:
P(X = k) = C(n, k) * p^k * (1-p)^(n-k)
Where:
P(X = k) is the probability of getting exactly k successes (97 in this case)
C(n, k) is the number of ways to choose k successes out of n trials (100 in this case)
p is the probability of success (probability of having chickenpox = 0.90)
n is the total number of trials (100 in this case)
Using these values, we can calculate:
P(X = 97) = C(100, 97) * 0.90^97 * 0.10^3
= 100 * (0.90)^97 * (0.10)^3
≈ 0.0975
So, the probability that exactly 97 out of 100 randomly sampled American adults had chickenpox during childhood is approximately 0.0975 or 9.75%.
(c) The probability that exactly 3 out of a new sample of 100 American adults have not had chickenpox in their childhood can be calculated using the binomial probability formula:
P(X = k) = C(n, k) * p^k * (1-p)^(n-k)
Where:
P(X = k) is the probability of getting exactly k successes (3 in this case)
C(n, k) is the number of ways to choose k successes out of n trials (100 in this case)
p is the probability of success (probability of not having chickenpox = 0.10)
n is the total number of trials (100 in this case)
Using these values, we can calculate:
P(X = 3) = C(100, 3) * 0.10^3 * 0.90^97
= 161,700 * (0.10)^3 * (0.90)^97
≈ 0.0315
So, the probability that exactly 3 out of a new sample of 100 American adults have not had chickenpox in their childhood is approximately 0.0315 or 3.15%.
(d) To calculate the probability that at least 1 out of 10 randomly sampled American adults have had chickenpox, we can use the complement rule: P(at least 1) = 1 - P(none)
Where P(none) is the probability of none of the 10 sampled adults having chickenpox.
Using the binomial formula:
P(X = 0) = C(n, k) * p^k * (1-p)^(n-k)
Where:
P(X = 0) is the probability of getting exactly 0 successes
C(n, k) is the number of ways to choose 0 successes out of n trials (10 in this case)
p is the probability of success (probability of having chickenpox = 0.90)
n is the total number of trials (10 in this case)
Using these values, we can calculate:
P(X = 0) = C(10, 0) * 0.90^0 * 0.10^10
= 1 * (0.90)^0 * (0.10)^10
≈ 0.3487
So, P(none) ≈ 0.3487
Therefore, P(at least 1) = 1 - P(none) = 1 - 0.3487 = 0.6513
So, the probability that at least 1 out of 10 randomly sampled American adults have had chickenpox is approximately 0.6513 or 65.13%.
(e) To calculate the probability that at most 3 out of 10 randomly sampled American adults have not had chickenpox, we can add up the probabilities of getting 0, 1, 2, and 3 successes:
P(X ≤ 3) = P(X = 0) + P(X = 1) + P(X = 2) + P(X = 3)
We can use the binomial probability formula to calculate each individual probability:
P(X = k) = C(n, k) * p^k * (1-p)^(n-k)
Where:
P(X = k) is the probability of getting exactly k successes (0, 1, 2, or 3 in this case)
C(n, k) is the number of ways to choose k successes out of n trials (10 in this case)
p is the probability of success (probability of not having chickenpox = 0.10)
n is the total number of trials (10 in this case)
Using these values, we can calculate each individual probability:
P(X = 0) = C(10, 0) * 0.10^0 * 0.90^10
P(X = 1) = C(10, 1) * 0.10^1 * 0.90^9
P(X = 2) = C(10, 2) * 0.10^2 * 0.90^8
P(X = 3) = C(10, 3) * 0.10^3 * 0.90^7
Adding up these probabilities, we get:
P(X ≤ 3) = P(X = 0) + P(X = 1) + P(X = 2) + P(X = 3)
≈ 0.9873
So, the probability that at most 3 out of 10 randomly sampled American adults have not had chickenpox is approximately 0.9873 or 98.73%.
If a straight line passes through the point x = 8 and y = 4 and also through the point x = 12 and y = 6, the slope of this line is
Answers
The slope of the line that passes through (4, 8) and (6, 12) will be 1/2.
What is a linear equation?A connection between a number of variables results in a linear model when a graph is displayed. The variable will have a degree of one.
The linear equation is given as,
y = mx + c
Where m is the slope of the line and c is the y-intercept of the line.
The slope of the line is given as,
m = (y₂ - y₁) / (x₂ - x₁)
If a straight line passes through the point x = 8 and y = 4 and also through the point x = 12 and y = 6. Then the slope is given as,
m = (6 - 4) / (12 - 8)
m = 2 / 4
m = 1 / 2
The slope of the line that passes through (4, 8) and (6, 12) will be 1/2.
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The cost of a ticket to a soccer game is $6. There are y number of people in a group that want to go to a game. Which of the following expressions describes the total amount of money the group will need to go to the soccer game?
Answers
6y
Hope this helps!! :)
the equation would look something like
total = 6y
since you don't show the choices look for something similar.
Write an equation in point-slope form of the line that passes through the point (−8, −2) and has a slope of m=5
Answers
To write the equation in point-slope form, we can use the formula y - y1 = m(x - x1), where (x1, y1) is a point on the line and m is the slope.
Explanation:To write an equation in point-slope form, we can use the formula y - y1 = m(x - x1), where (x1, y1) is a point on the line and m is the slope. In this case, the given point is (-8, -2) and the slope is 5. Plugging in these values into the formula, we get:
y - (-2) = 5(x - (-8))
Simplifying the equation, we get:
y + 2 = 5(x + 8)
Therefore, the equation in point-slope form of the line that passes through the point (-8, -2) with a slope of 5 is y + 2 = 5(x + 8).
if the flour to sugar ratio is 5 liters flour to 1 liter sugar, then how much sugar is needed if only 2 liters of flour are used ?
Answers
Answer:
0.4 liters of sugar.
Step-by-step explanation:
Hello, I think I can help you with this
you can easily solve this by using a rule of three
Step 1
if
5 liters flour⇒ 1 liter sugar
2 liters flour⇒ x?liter sugar
do the relation
[tex]\frac{5\ liters\ flour}{1\ liter\ sugar}=\frac{2\ liters\ flour}{x}\\\\solve\ for\ x\\\\\\\frac{x*5\ liters\ flour}{1\ liter\ sugar}=2\ liters\ flour\\x=\frac{2\ liters\ flour*1\ liter\ sugar}{5\ liters\ flour} \\x=\frac{2}{5}liter\ sugar\\x=0.4\ liters\ of\ sugar\\[/tex]
0.4 liters of sugar
I hope it helps, Have a great day-
The pie below is cut into 6 equal slices. Show shade 2/3 of this pie.
Answers
Just shade 4 out of 6 slices.
This is because 2/3 = 4/6.
To be sure you can even simplify 4/6 to 2/3.
Hope this helps!
A batch of 140 semiconductor chips is inspected by choosing a sample of 5 chips. assume that 10 of the chips do not conform to customer requirements. the number of samples of 5 containing exactly one nonconforming chip is closest to:
Answers
p = 10/140 = 0.0714
The probability of having a good chip is
q = 1 - p = 0.9286
Out of a sample of 5, the probability of finding a defective chip is
₅C₁ p¹ q⁴ = 5*0.0714*0.9286⁴ = 0.2655
The number of defective chips ofu of 5 is 0.2655*5 = 1.3275 ≈ 1
Answer : 1 chip
837,164 and 4,508 the value of 8
Answers
In 4,508, the value of 8 is the ones place
hope this helps
For each function f(n) and time t in the table, determine the largest size n of a problem that can be solved in time t, assuming that the algorithm to solve the problem takes f(n) microseconds
Answers
The question involves estimating the largest problem size a one-teraflop computer can solve in a given time, by equating the time complexity function of the problem to the number of operations the computer can perform per second, and solving for n.
The task is to estimate the largest problem size n that can be solved by a one-teraflop machine within a given time t. A teraflop machine is capable of performing 1012 operations per second. To determine n, we must consider the time complexity function f(n) that describes how the number of operations grows with the size of the problem. Given that the machine can perform 1012 instructions per second, and t is measured in microseconds, we first convert t to seconds.
For example, if the function f(n) follows a linear time complexity, such as f(n) = n, and the computation time t is 1 second, the largest problem size that can be solved is 1012, since the machine can perform 1012 operations in one second.
If the computational complexity is higher, say quadratic as f(n) = n2, we would solve for n in the equation n2 = 1012 to find the largest n that can be solved within 1 second.
Similarly, for more complex functions, we would find the value of n that satisfies the equation f(n) = 1012 * t in seconds, ensuring the result is within the operational constraints of the machine.
Lines are drawn through the point (2, 8) and the points given below. Select two points that correspond with lines with negative slopes.
(-2, -6)
(0, 9) (
1, -3)
(5, 6)
(10, 11)
Answers
To find two points with negative slopes, we can calculate the slopes of the lines passing through the point (2, 8) and each of the given points. The pairs of points with negative slopes are (-2, -6) and (1, -3).
Explanation:A line has a negative slope when it goes down from left to right. To find two points with negative slopes, we can calculate the slopes of the lines passing through the point (2, 8) and each of the given points.
Using the slope formula, slope = ∆y / ∆x, we can calculate the slopes:
-2, -6: slope = (-6 - 8) / (-2 - 2) = -14 / -4 = 3.5
1, -3: slope = (-3 - 8) / (1 - 2) = -11 / -1 = 11
Therefore, the pairs of points with negative slopes are (-2, -6) and (1, -3).
A car manufacturer wants to change the content of a certain automobile to have less steel in order to get better gas mileage. One hundred standard cars and 100 cars of the new content are built and test driven across country to determine the overall gas mileage. This study is an
Answers
The car manufacturer wants to test some changes that he wants to implement in his cars, which is why he has two control groups (standard cars and cars with the new content) to test those changes out. This is a typical experiment and not an observation as he is not really observing much.
Answer:
experiment
Step-by-step explanation:
Determine tan(t) if cos(t)= -3/5 and sin(t) >0
Answers
now, the hypotenuse is just a radius unit, so, is never negative, so, the fraction is negative because the numerator is negative, that is, the adjacent side is -3.
now, let's use the pythagorean theorem to find the opposite side.
[tex]\bf \textit{using the pythagorean theorem}\\\\ c^2=a^2+b^2\implies \pm\sqrt{c^2-a^2}=b\qquad \begin{cases} c=hypotenuse\\ a=adjacent\\ b=opposite\\ \end{cases} \\\\\\ \pm\sqrt{5^2-(-3)^2}=b\implies \pm\sqrt{25-9}=b\implies \pm 4=b[/tex]
ok... so, which is it? the +/-? well, we also know that sin(t) >0, namely that the sine of the angle is positive, so, then is +4 then.
[tex]\bf tan(\theta)=\cfrac{opposite}{adjacent}\qquad \qquad tan(t)=\cfrac{4}{-3}\implies \boxed{tan(t)=-\cfrac{4}{3}}[/tex]
An airlines records show that its flights between two cities arrive on the average 5.4 minutes late with a standard deviation of 1.4 minutes. at least what percentage of its flights between the two cities arrive anywhere between
Answers
What is 48,371 rounded to the nearest thousand?
Answers
Is 3 a good estimate for 3.4x0.09
Answers
Fritz drives to work his trip takes 36 minutes, but when he takes the train it takes 20 minutes. Find the distance Fritz travels to work if the train travels an average of 32 miles per hour faster than his driving. Assume that the train travels the same distance as the car.
Answers
so, let's say Fritz travel by Car at a speed of "r", if the Train runs faster then his car, then the Train runs at "r+32".
Bear in mind that, he travels from home to work by Car or Train, so, the distance if the same for either vehicle, let's say is "d" miles.
[tex]\bf \begin{array}{lccclll} &\stackrel{miles}{distance}&\stackrel{mph}{rate}&\stackrel{minutes}{time}\\ &-----&-----&-----\\ Car&d&r&36\\ Train&d&r+32&20 \end{array} \\\\\\ \begin{cases} \boxed{d}=36r\\ d=20(r+32)\\ ----------\\ \boxed{36r}=20(r+32) \end{cases} \\\\\\ \cfrac{36r}{20}=r+32\implies \cfrac{9r}{5}=r+32\implies 9r=5r+160 \\\\\\ 4r=160\implies r=\cfrac{160}{4}\implies \boxed{r=40}[/tex]
so... he travels at 40mph for 36 minutes, now, 36minutes is not even an hour, is 36/60 or 3/5 hr, so... [tex]\bf 40\cdot \cfrac{36}{60}\implies 40\cdot \cfrac{3}{5}\implies \stackrel{miles}{24}[/tex]
The distance Fritz travels to work is 24 miles if Fritz drives to work his trip takes 36 minutes, but when he takes the train it takes 20 minutes.
What is the distance?Distance is a numerical representation of the distance between two items or locations. Distance refers to a physical length or an approximation based on other physics or common usage considerations.
It is given that:
Fritz drives to work his trip takes 36 minutes, but when he takes the train it takes 20 minutes.
Let the distance Fritz travels to work is x.
As we know,
1 hour = 60 minutes
36/60 = 0.6 hrs
20/60 = 0.33 hrs
Speed = distance/time
Train speed - drive speed = 32
x/0.33 - x/0.6 = 32
After simplification:
9d - 5x = 96
4x = 96
x = 96/4
d = 24 miles
Thus, the distance Fritz travels to work is 24 miles if Fritz drives to work his trip takes 36 minutes, but when he takes the train it takes 20 minutes.
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If ab= 8 in. and cd= 6 in., how long is a radius?
Answers
if the quotient of -20 and 4 is decreased by 3 what number results
Answers
quotient is divide
-20/4 = -5
-5 -3 = -8
Find the standard equation of the circle having the given center (6,-2) and radius 1/5.
Answers
(x-6)²+(y-(-2))²=(1/5)²
= 1/25
= (x-6)²+(y+2)²
Joan and Jane are sisters. Jean is Joan's daughter and 12 years younger than her aunt. Joan is twice as old as Jean. Four years ago, Joan was the same age as Jane is now, and Jane was twice as old as her niece. How old is Jean?
Answers
Jean is 12 years old. Joan is 24 years old, and Jane is 20 years old. Four years ago, Joan was 20 and Jane was 16.
Let's denote:
- Joan's current age as J
- Jane's current age as N
- Jean's current age as I
Given:
1. Jean is 12 years younger than Joan: I = J - 12
2. Joan is twice as old as Jean: J = 2I
3. Four years ago, Joan was the same age as Jane is now: J - 4 = N
4. Jane was twice as old as her niece four years ago: N - 4 = 2(I - 4)
Using equation (1) and (2):
J = 2(J - 12)
J = 2J - 24
J = 24
Now substituting J = 24 into equation (1):
I = 24 - 12
I = 12
So, Jean is currently 12 years old.
how do you equally divide 12 cookies with 8 people. what fraction of cookies would each person receive?
Answers
in other words 1 1/2
Final answer:
To equally divide 12 cookies among 8 people, each person would receive 1 1/2 or 1.5 cookies, which is a fraction of 3/2 per person when simplified.
Explanation:
To divide 12 cookies equally among 8 people, we need to perform a simple division operation where 12 (total number of cookies) is divided by 8 (number of people). Mathematically, this can be represented as 12/8 which simplifies to 1 1/2 or 1.5 cookies per person. This means that each person would receive one and a half cookies.
If the problem requires the answer as a fraction, we can simplify 12/8 by dividing both numerator and denominator by their greatest common divisor, which is 4 in this case. Thus, we get 12/8 = (12÷4) / (8÷4) = 3/2. Therefore, each person gets 3/2 or one and a half cookies.
In January, Emma was 62.25 in tall. In December, she was 65.5 inches tall. How much did Emma grow between January and December?
Answers
she "grew" negative 3.25 inches
it is negative because she was taller in December than she was in January
A restaurant earns $1073 on Friday and $1108 on Saturday. Write and solve an equation to find the amount xx (in dollars) the restaurant needs to earn on Sunday to average $1000 per day over the three-day period. Write your equation so that the units on each side of the equation are dollars per day.
Answers
(2181 + x) / 3 = 1000
2181 + x = 1000 * 3
2181 + x = 3000
x = 3000 - 2181
x = 819 <=== the restaurant would need to make $ 819
Write the expression that shows 3 time the sixth power of 10
Answers
Shouldn't be too hard for ya ;)
Find the value of y log4 64=y
Answers
Answer:
y=log4 64=2.6665.
Step-by-step explanation:
We are given that logarithmic expression
y=log 464
By using logarithmic rules
Substitute the decimal point after end digit and then put zero after decimal point
We can write as
y=log464.0
To put the decimal point after one digit from left then we move two steps.Therefore ,we write 2 on left side of the decimal point in final result
Now, we see the value of 46 at 4 from log table then we get the value of 46 at 4 is 6665
Therefore , y=log464=2.6665
Hence, the value of y=2.6665
The value of y to the equation log₄(64) = y is y = 3.
The given logarithmic equation is :
y = log₄(64)
This can be written in exponential form as :
4^(y) = 64
It is known that :
4 × 4 × 4 = 64
So,
4³ = 64
Hence the value of y = 3.
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Add.
7 2/15 + 5 2/3 + 9 13/15
20 2/3
21 10/15
21 2/3
22 2/3
Answers
The only one that needs to be changed a little is 5 2/3 so that it will also have 15 as a denominator.
5 2/3 * 5/5 = 5 10/15
7 2/15 + 5 10/15 + 9 13/15
12 12/15 + 9 13/15
21 25/15
21 25/15
We can simplify this a bit further by dividing the fraction by 5.
21 25/15 = 21 5/3
21 5/3
Now change the improper fraction into a mixed fraction and add the whole number to the current whole number.
5/3 = 1 2/3
21 + 1 2/3 = 22 2/3
The answer is
D. 22 2/3
Adding together the whole number parts gives us 21. When we add the fractions, we get 25/15, which simplifies to 1 10/15. Adding this to our whole number sum gives us 22 10/15, or 22 2/3.
Explanation:To find the sum of these mixed numbers, you'll want to first add the whole number parts, and then add the fractions. In this case, adding together the whole numbers 7, 5, and 9 gives us 21.
The fractions 2/15, 2/3, and 13/15 can be added together by finding a common denominator. The common denominator for 15 and 3 is 15, therefore 2/3 becomes 10/15 when it is converted.
When we add 2/15, 10/15, and 13/15, we get 25/15, which can be reduced to 1 10/15.
When we add this to our whole number sum, we get 22 10/15,
which simplifies to 22 2/3.
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combing like terms? 4(1.75y-3.5)+1.25y
Answers
4 (1.75y - 3.5) + 1.25y
4 * 1.75 y = 7
4* (-3.5) = (-14)
7y - 14 + 1.25y
Combine like terms
8.25y - 14
Answer:
8.25y-14
Step-by-step explanation:
The given expression is [tex]4(1.75y-3.5)+1.25y[/tex]
Distribute 4 over the parenthesis
[tex]4\cdot1.75y+4\cdot(-3.5)+1.25y\\\\=7y-14+1.25y[/tex]
Now. group the like terms
[tex](7y+1.25y)-14[/tex]
Finally combine the like terms
[tex]8.25y-14[/tex]
Therefore, the simplified expression is 8.25y-14
For rhombus LMNO, m∠LON = 102° and NP = 5 units. Use the diagram of rhombus LMNO to find the missing measures. The measure of ∠LPM is °. The measure of ∠PMN is °. The length of LN is units.
Answers
PMN = 51
LN = 10
Answer:
1. 90
2. 50
3. 10
Step-by-step explanation:
The function f(x) = 68(1.3)x represents the possible squirrel population in a park x years from now. Each year, the expected number of squirrels is ____ the number the year before.
Answers
This is the rate of change,
Answer:
1.3 times
Step-by-step explanation:
A red string of holiday lights blinks once every 3 seconds while a string of blue lgihts blink once every 4 seconds. how many times with both sets of lights blink at the same time in 1 minute
Answers
For example, the multiples of 3 are 6, 9, 12, etc.
3: 3, 6, 9, 12...
4: 4, 8, 12...
So the least common multiple is 12.
So we know they blink at the same time once every 12 seconds.
Now we just need to find how many times 12 fits into a minute, or 60 seconds.
60 / 12 = 5
So the lights will blink at the same time 5 times in one minute.