Can someone help me in probability?Amanda wrote a computer program that generates two random numbers between one and eleven.When she runs it,what is the probability that both values will be more than three?
Answers
so 8/11 is the probablity of finding a number higher than 3 out of 11
could also be written as:
8/11
8:11
.73
73 percent
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Marcia can make 5 candles in an hour. Kevin can make only 4 candles in an hour, but he already has 7 completed candles. how can Marcia use a system of equations to determine when she will have the same number of candles as Kevin?
What is 35/6 as a mixed number
How many multiples of 9 are there between 100 and 2,000?
Planning for the possiblity that your home might get struck by lightning and catch on fire is part of a plan for _____.
Answers
-2x + 5 < 7
-5 -5 deduct 5 from both sides
-2x < 2
÷ -2 ÷ -2 divide both sides by negative 2. Because of the division
x > -1 using a negative number, the sign is then reversed.
from < it becomes >.
The value of x should be greater than -1. It can be 0, 1, 2, so on...
To check: Revert back to the original sign which is <.
x = 1
-2x + 5 < 7
-2(1) + 5 < 7
-2 + 5 < 7
3 < 7
Answers
Answer: 0.40 = x
Step-by-step explanation:
3x + 13 = 7x - 15
15 - 13 = 7x - 3x
2 = 5x
2/5 = x
0.40 = x
a.4
b.2
c.−2
d.−4
Answers
Answers
Answer:
on plato E. 480,20
Step-by-step explanation:
Answers
Answer:To solve the system of equations using substitution, we'll start by solving one equation for one variable, and then substitute that expression into the other equation.
Let's solve the second equation, y = 3x - 7, for y:
y = 3x - 7 (Equation 2)
Now, we can substitute this expression for y in the first equation, 2x + y = 3:
2x + (3x - 7) = 3
Combining like terms, we have:
5x - 7 = 3
Adding 7 to both sides of the equation, we get:
5x = 10
Dividing both sides of the equation by 5, we have:
x = 2
Now that we have the value of x, we can substitute it back into one of the original equations to find the value of y. Let's use Equation 2:
y = 3x - 7
Substituting x = 2, we have:
y = 3(2) - 7
Simplifying the expression, we get:
y = 6 - 7
y = -1
Therefore, the solution to the system of equations is x = 2 and y = -1.
We can also check this solution by substituting the values of x and y back into both original equations to make sure they satisfy both equations.
A pooling equilibrium exists as long as the number of Type H customers in the market is relatively low.
True or False
A pooling equilibrium exists as long as the number of Type H customers in the market is relatively high.
True or False
Brainly Ginny character avatar
AI-generated answer
A pooling equilibrium exists when all customers, regardless of their type, are offered the same product or service. In a pooling equilibrium, the market does not differentiate between different customer types.
Given the statement "A pooling equilibrium exists as long as the number of Type H customers in the market is relatively low," we can analyze its truthfulness:
If the number of Type H customers in the market is relatively low, it means that there are fewer customers of Type H compared to other types. In this scenario, it is more likely that the market will offer a single product or service that caters to the majority of customers, including non-Type H customers. Therefore, it is true that a pooling equilibrium is more likely to exist when the number of Type H customers is relatively low.
On the other hand, if the number of Type H customers in the market is relatively high, it means that there is a significant presence of Type H customers. In this case, the market might be inclined to offer specialized products or services that specifically cater to the needs and preferences of Type H customers. This would result in a segmentation or differentiation of the market, which contradicts the concept of a pooling equilibrium. Therefore, it is false to say that a pooling equilibrium exists when the number of Type H customers is relatively high.
To summarize:
- A pooling equilibrium is more likely to exist when the number of Type H customers in the market is relatively low. (True)
- A pooling equilibrium is less likely to exist when the number of Type H customers in the market is relatively high. (False)
what is the combined version of the equations 5.2*10^6 and 2.47*10^8
Brainly Ginny character avatar
AI-generated answer
To find the combined version of the given equations 5.2*10^6 and 2.47*10^8, we need to add or subtract the numbers and keep the same power of 10.
The numbers in scientific notation have two parts: the coefficient and the power of 10. In this case, we have:
5.2 * 10^6 and 2.47 * 10^8
To combine them, we need to make sure that the powers of 10 are the same. We can do this by adjusting the coefficients.
First, let's adjust the coefficient of 5.2*10^6. We can do this by multiplying it by 10^2:
5.2 * 10^6 * 10^2 = 5.2 * 10^(6+2) = 5.2 * 10^8
Now that we have adjusted the coefficient of 5.2*10^6, we can combine it with 2.47*10^8:
5.2 * 10^8 + 2.47 * 10^8 = (5.2 + 2.47) * 10^8 = 7.67 * 10^8
Therefore, the combined version of the equations 5.2*10^6 and 2.47*10^8 is 7.67*10^8.
Answers
Take your time and DO NOT RUSH
It might be very confusing at first but take it step by step and don't stress.