Answer:
4.5 cups
Explanation:
The information about how much salt was added is irrelavant. If you add 3 cups to 1.5 cups you wil get 4.5 cups.
The characteristic that makes Harper a good candidate for LASIK is c. Her contact lens and glasses prescription has not changed in the past two years.
<h3>Why is Harper a good candidate for LASIK?</h3><h3 />
A good candidate for LASIK is one that is due to change their eye prescription/
As eye prescriptions are to be changed every 2 years, Harper would be a good candidate if she has not changed either her contact lens or prescription glasses.
Options for this question are:
a. She is not a risk-taker.
b. She has an autoimmune disease.
c. Her contact lens and glasses prescription has not changed in the past two years.
d. She is currently taking martial arts lessons.
e. She is unsure if she can afford to pay the surgery.
Find out more on prescription glasses at brainly.com/question/7483014
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B)73 as it is the same rate as from 15 euros to 11 pounds - hope this helps :)
The probability is analyzed with the help of statistics. The probability of the person buying cereal once a month through the Venn diagram is given as, 53/64. Thus, option C is correct.
<h3>What is the Venn diagram?</h3>
A Venn diagram is the illustration of the information or the data that are in relation to other data and are represented in the form of circles.
The Venn diagram shows the total number of people who eat breakfast (A) every day, and another set shows people who buy cereals (B).
n (A) = 11 + 53 = 64
n (B) = 53 + 4 = 57
n (AB) = 53
Probability of buying cereals for the person eating breakfast every day:
= P (B/A) = P(AB) / P(A) = n(AB )/ n(A) = 53/64
Therefore, option C. 53/64 is the probability.
Learn more about the Venn diagram here:
brainly.com/question/11536075
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To find the values of a and b, we can use the given information about the function f(x) and its derivatives at x = 0.
First, we know that the value of f(0) is 1, which means that when we plug x = 0 into the function, we get f(0) = 20 + a0 + b*0^2 - 0 + 2 = 1. Solving this equation for b, we get b = -1.
Next, we know that the derivative of the function f(x) at x = 0 is ƒ'(0) = 1. The derivative of a polynomial function is given by ƒ'(x) = 2x + ax + bx^2 - 1. Plugging in x = 0, we get ƒ'(0) = 20 + a0 + (-1)*0^2 - 1 = 1. Solving for a, we get a = 1.
Therefore, the values of a and b are a = 1 and b = -1. The sum of these values is a + b = 1 + (-1) = 0.
