the answer is gas hope you pass
The correct adjectives that can be used in the sentences will be:
- He likes participating in the games. He is so <u>enthusiastic</u>.
- Our exam yesterday was <u>perplexing</u>.
- My cousin was so <u>sanguine </u>that we slept very late last night.
- Maria was <u>thrifty </u>for buying these second-hand bags.
- Jayson uses only a metal straw to drink. He is <u>weird</u><u>.</u>
- She has grown up to be a <u>book geek</u> since she just likes to study all the time.
- Arang, our toddler neighbor, asks a lot of questions. She is so <u>inquisitive</u>.
- Jessica stays late every night reading books about philosophy. She has become more <u>geriatric </u>than her age.
- The gifts Nathan gave to his workers were <u>lavish</u>.
- Our new teacher is <u>placatory</u>.
<h3>What is an adjective?</h3>
It should be noted that adjectives are the words that are used to describe nouns or pronouns.
In this case, the adjectives used are important in turning the sentence into grammatically correct positive statements.
Learn more about adjectives on:
brainly.com/question/550822
The probability that X is greater than 70 and less than 90 is; 0.85
<h3>How to find the probability?</h3>
Let X be the binomial random variable with the parameters:
n = 200
p = 0.4
Then, the random variable Z defined as:
Z = (X - np)/(√(np(1 - p)
The probability that X is greater than 70 and less than 90 is expressed as; P(70 < X < 90)
At X = 70, we have;
Z = (70 - (200*0.4))/(√(200 * 0.4(1 - 0.4))
Z = -1.44
At X = 90, we have;
Z = (90 - (200*0.4))/(√(200 * 0.4(1 - 0.4))
Z = 1.44
Thus, the probability would be expressed as;
P(-1.44 < Z < 1.44)
From online p-value calculator, we have;
P(-1.44 < Z < 1.44) = 0.85
Complete question is;
Suppose that X is a binomial random variable with n = 200 and p = 0.4 Approximate the probability that X is greater than 70 and less than 90.
Read more about probability at; brainly.com/question/4621112
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The third one because you do the steps
Assume all conditions for inference have been met, based on the confidence interval, the claim that is supported is that;
More than half of all people prefer texting.
<h3>Understanding Confidence Intervals</h3>
We are given;
Confidence Level; CL = 95%
Margin of error; MOE = 3%
Since 56 percent of the respondents prefer to use cell phones for texting rather than for making phone calls. It means that; x' = 56%
Thus;
CI = x' ± MOE
CI = 56% ± 3%
CI = 53% OR 59%
Thus, in conclusion we can say that more than half of the people prefer texting
Read more about Confidence Intervals at; brainly.com/question/17097944
