MATHEMATICS COLLEGE

6/8 reduced to the lowest term

Answers

Answer 1

Answer:

Answer:

3/4

Step-by-step explanation:

Answer 2

Answer:

Answer:

3/4

Step-by-step explanation:

both the numerator and denominator can be divided by 2

6/2=3

8/2=4

so 6/8 in lowest terms is 3/4

Related Questions

Find the first, fourth, and tenth terms of the arithmetic sequence described by the given rule.A(n) = 1 + (n – 1)(–5.7)1, –21.8, –56–5.7, –21.8, –51.31, –16.1, –50.30, –17.1, –51.3If someone answers this, i'd like if someone could help me to know how to solve it too, please and thank you!
Solve the following equation for the given variable 3(x+6)=-9
Please help! ASAP correct answer will get brainliest!!!
1. Led the Russians in a second revolution 2. promised peace land and bread 3. established the new economic policy (NEP) : which leader is being described by these statements ?
A hole is punched in a piece of metal to make a part for a machine. What is the area of the metal part, or the shaded region shown?

8. A carpenter balances his daily projects between small jobs (x) and building cabinets (y). He allots 2hours per small job and 4 hours per cabinet job. He works at most 12 hours per day (2x + 4y <_12).
He cannot do more than 3 small jobs per day
and get all of his cabinets done (Y >_0) & (0The carpenter earns $125 per small job and $500 per cabinet job. Find a combination of small jobs and
completed cabinet jobs per week that will maximize income.

Answers

Answer:

$\$1125$

Step-by-step explanation:

The equations of the system are

$2x+4y\leq 12$

$y\geq 0$

$0<x\leq 3$

From the graph it can be seen that points $(3,1.5)$ and $(3,0)$ falls in the bounded region.

The income will be

$125x+500y=125* 3+500* 1.5\n =\$1125$

$125* 3+500* 0=\$375$

So, the person can do 3 small jobs and build 1 and a half cabinets per day.

The maximum income will be $\$1125$ .

What is the image of (0, -8) after a reflection over the line y = -x?
Submit Answer

Answers

The required reflection of the point (0, -8) on the line y = -x is (8, 0).

To determine the image of (0, -8) after a reflection over the line y = -x.

What is the equation?

the equation is the relationship between variables and represented as y = ax + b is an example of a polynomial equation.

Here,
For the image of the point of the line y = -x
The reflection of point (0, - 8) is given as by swaping the value and change the sign, So the image of the point is (8, 0).

Thus, the required reflection of the point (0, -8) on the line y = -x is (8, 0).

Learn more about equation here:

brainly.com/question/10413253

#SPJ2

Answer:

(8,0)

Step-by-step explanation:

could be negative 8 but it said positive 8

positive works

Writing on the SAT Exam It has been found that scores on the Writing portion of the SAT (Scholastic Aptitude Test) exam are normally distributed with mean 484 and standard deviation 115. Use the normal distribution to answer the following questions. Required:
a. What is the estimated percentile for a student who scores 425 on Writing?
b. What is the approximate score for a student who is at the 87th percentile for Writing?

Answers

Answer:

a) The estimated percentile for a student who scores 425 on Writing is the 30.5th percentile.

b) The approximate score for a student who is at the 87th percentile for Writing is 613.5.

Step-by-step explanation:

Problems of normally distributed distributions are solved using the z-score formula.

In a set with mean $\mu$ and standard deviation $\sigma$ , the zscore of a measure X is given by:

$Z = (X - \mu)/(\sigma)$

The Z-score measures how many standard deviations the measure is from the mean. After finding the Z-score, we look at the z-score table and find the p-value associated with this z-score. This p-value is the probability that the value of the measure is smaller than X, that is, the percentile of X. Subtracting 1 by the pvalue, we get the probability that the value of the measure is greater than X.

In this question, we have that:

$\mu = 484, \sigma = 115$

a. What is the estimated percentile for a student who scores 425 on Writing?

This is the pvalue of Z when X = 425. So

$Z = (X - \mu)/(\sigma)$

$Z = (425 - 484)/(115)$

$Z = -0.51$

$Z = -0.51$ has a pvalue of 0.3050.

The estimated percentile for a student who scores 425 on Writing is the 30.5th percentile.

b. What is the approximate score for a student who is at the 87th percentile for Writing?

We have to find X when Z has a pvalue of 0.87. So X for Z = 1.126.

$Z = (X - \mu)/(\sigma)$

$1.126 = (X - 484)/(115)$

$X - 484 = 1.126*115$

$X = 613.5$

The approximate score for a student who is at the 87th percentile for Writing is 613.5.

What percent of 68 is 34

Answers

Answer:

Step-by-step explanation:

Use the compound interest formulas A = P 1 + r n nt and A = Pe rt to solve. 2) Suppose that you have $8000 to invest. Which investment yields the greater return over 6 years: 6.25% compounded continuously or 6.3% compounded semiannually? 2) A) $8000 invested at 6.3% compounded semiannually over 6 years yields the greater return. B) $8000 invested at 6.25% compounded continuously over 6 years yields the greater return. C) Both investment plans yield the same return.

Answers

Answer: A

Compound interest simply defined as the interest added at regular interval. Compound interested can be calculated using

Compound interest = P (1+) ^nt and Pe ^rt

P = Initial balance

r = Annual interest rate

n = Number of times the interest is compounded per year

t =Number of year money is invested

Using

Compound interest = P (1+ ) ^nt

Continuous

P= $ 8000

t = 6

r = 6.25%

= 0.0625

n = 1

Compound interest = 8000 (1+) ^1×6

= 8000 (1 + 0.0625) ^6

= 8000 (1.0625) ^ 6

= 8000× 1.4387

= $11,509.6

Semi- annually

P= $ 8000

t = 6

r = 6.3%

= 0.063

n = 2

Compound interest = 8000 (1+) ^2×6

= 8000 (1 + 0.063) ^12

= 8000 (1.063) ^12

= 8000× 1.4509

= $11,607.0

Investing $ 8000 semi-annually at 6.3% for 6 years yields greater return

Therefore the answer is (A)

Why is underfind the square root of a negative number?

Answers

Answer:

The square root of a negative number is undefined, because anything times itself will give a positive (or zero) result. Note: Zero has only one square root (itself). Zero is considered neither positive nor negative

Answer:

sjshzhshshdhdgdgdhdhdgshshshshshwywhwhw

Other Questions

The white "Spirit" black bear (or Kermode) Ursus americanus kermodei, differs from the ordinary black bear by a single amino acid change in the melanocortin 1 receptor gene (MC1R). In this population, the gene has two forms (or alleles): the "white" allele b and the "black" allele B. The trait is recessive: white bears have two copies of the white allele of this gene (bb), whereas a bear is black if it has one or two copies of the black allele (Bb or BB). Both color morphs and all three genotypes are found together in the bear population of the northwest coast of British Columbia. If possessing the white allele has no effect on growth, survival, reproductive success, or mating patterns of individual bears, then the frequency of individuals with 0, 1, or 2 copies of the white allele (b) in the population will follow a binomial distribution. To investigate, Hedrick and Ritland (2011) sampled and genotype 87 bears from the northwest coast:42 were BB 24 were Bb 21 were bb Assume that this is a random sample. A formal hypothesis test was carried out to compare the observed and expected frequencies of genotypes. The procedure obtained P = 0.0001. 1. "The frequency distribution of genotypes has a binomial distribution in the population" is the________ hypothesis, whereas "The frequency distribution of genotypes does not have a binomial distribution" is the _________ hypothesis. 2. The degrees of freedom for the test statistic are __________. Say whether the each of the following statements is true or false solely on the basis of these results: 3. The difference between the observed and expected frequencies is statistically significant.________4. The test statistic exceeds the critical value corresponding to α = 0.05. ___________5. The test statistic exceeds the critical value corresponding to α = 0.01. ____________

2. Use the binomial theorem to expand the expression. (а — 2b)^5

Waylon played defense in 12 soccer games. This was 60% of the total games he played. How many games did Waylon play?

A Cepheid variable star is a star whose brightness alternately increases and decreases. For a certain star, the interval between times of maximum brightness is 4.2 days. The average brightness of this star is 3.0 and its brightness changes by ±0.25. In view of these data, the brightness of the star at time t, where t is measured in days, has been modeled by the function B(t) = 3.0 + 0.25 sin 2πt 4.2 . (a) Find the rate of change of the brightness after t days. dB dt =