What is the sale price of a phone that was originally $199 but that has been marked down by 15 percent?
$159.15
$159.20
$169.10
$169.15

The equation that can be used to represent the number of three-pose and six-pose portrait packages is: 35x + 60y = 690

Word problems in mathematics are methods and approaches applied in solving real-life scenarios. Data can be modeled from the certain information given.

From the parameters given, Let us assume that:

Now, on Saturday a total amount of 690 was collected. This data can be modeled as:

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Answer:

A

Step-by-step explanation:

Answer:

According to the distributive property of multiplication,

a . (b + c ) = (a . b) + (a . c)

Given: 7 × 6

which can be rewritten as: a)  7 . (4 + 2), b)   7 . (3 + 3), c)   7 . (1 + 5)

Rewriting the given expression using the distributive property of multiplication:

a)   7 . (4 + 2) = (7 . 4) + (7 . 2)

7 . (6) = 28 + 14

42 = 42

b)   7 . (3 + 3) = (7 . 3) + (7 . 3)

7 . (6) = 21 + 21

42 = 42

c)   7 . (1 + 5) = (7 . 1) + (7 . 5)

7 . (6) = 7 + 35

42 = 42

As the left hand side is equal to the right hand side in each case, therefore, it proves the distributive property.

Mark = m

Lisa = 3m ( 3 times as old as Mark)

 Carly = 3m-5 ( 5 years younger than Lisa)

expression is C = 3m-5

The length of the height triangle ABC is BD i.e., [tex]15\;units[/tex].

According to the question, In isosceles [tex]∆ABC[/tex]  the segment BD is the median to the base AC . Also, the perimeter of ∆ABC is 50m, and the perimeter of the triangle [tex]ABD[/tex] is 40m.

Let the length of the equal sides of the isosceles triangle be [tex]x \;meters[/tex] and the length of the base of the isosceles triangle is [tex]2y\;meters[/tex].

[tex]Perimeter_{ABC}=x+x+2y\\2x+2y=50\\x+y=25\\x=25-y----(i)[/tex]

Also,

[tex]Perimeter_{ABD}=x+y+BD\\x+y+\sqrt{x^2-y^2}=40\\x+y+\sqrt{(25-y)^2-y^2}=40\\25+\sqrt{625-50y}=40\\\sqrt{625-50y}=15\\625-50y=225\\y=8\;units[/tex]

So,

[tex]x=25-8\\x=17\;units[/tex]

Now,

[tex]BD=40-x-y\\BD=40-17-8\\BD=15\;units[/tex]

Hence, the length of the height triangle ABC is BD i.e., [tex]15\;units[/tex].

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There are 1,984 students in total at Palmer Elementary School and Palmer Middle School combined, showing an example of increasing school enrollments. This is calculated by simply adding the number of students from both schools.

Calculating the Total Number of Students

To find out how many students are in all at both Palmer Elementary School and Palmer Middle School, we add the number of students at each school together. Palmer Elementary School has 691 students, and Palmer Middle School has 1,293 students.

To determine the total, we perform the following addition:

Therefore, there are approximately 1,984 students in total at both schools combined. This calculation helps us understand the scale of student populations within a small section of the education system, reflecting broader national trends where school enrollments are increasing.

divide:

28 / 0.32 = 87.5

The percentage of 47% can be expressed as the fraction 47/100 in simplest form. This means that 47 out of every 100 units can be represented by the fraction 47/100.

The percentage is given as 47%.

To write 47% as a fraction in simplest form, we can interpret the percent symbol as meaning "per 100."

Recognize that percent means "per 100." Therefore, 47% can be written as 47 per 100 or 47/100.

Simplify the fraction by finding the greatest common divisor (GCD) of the numerator and denominator. In this case, the GCD of 47 and 100 is 1.

Divide both the numerator and denominator by their GCD to simplify the fraction:

(47 ÷ 1) / (100 ÷ 1) = 47/100

The resulting fraction, 47/100, is already in its simplest form.

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Final answer:

To find the x and y components of a vector, use the cosine and sine functions, respectively, with the given angle. For a vector of 60m at 38°, the components are approximately 47.28m (x) and 36.96m (y).

Explanation:

To find the x and y components of a vector given its magnitude and a direction, you can use trigonometric functions. Assuming the vector Δr is the one you're referring to, with a magnitude of 60m and an angle of 38° (from the x-axis, presumed direction), you can apply the cosine function for the x-component and the sine function for the y-component of the vector.

For the x-component: x = magnitude × cos(angle) = 60m × cos(38°) = 60m × 0.788 = 47.28m

For the y-component: y = magnitude × sin(angle) = 60m × sin(38°) = 60m × 0.616 = 36.96m

Therefore, the x and y components of the vector are approximately 47.28m and 36.96m, respectively.

Answer:

The sum of the given expression is (m+1).

Step-by-step explanation:

The given expression is

[tex]\frac{1}{3}(9-6m)+\frac{1}{4}(12m-8)[/tex]

Use distributive property to to simplify the given expression.

[tex]\frac{1}{3}(9-6m)+\frac{1}{4}(12m-8)=\frac{1}{3}(9)+\frac{1}{3}(-6m)+\frac{1}{4}(12m)+\frac{1}{4}(-8)[/tex]

[tex]\frac{1}{3}(9-6m)+\frac{1}{4}(12m-8)=3-2m+3m-2[/tex]

Add like terms.

[tex]\frac{1}{3}(9-6m)+\frac{1}{4}(12m-8)=(3-2)+(-2m+3m)[/tex]

[tex]\frac{1}{3}(9-6m)+\frac{1}{4}(12m-8)=(1)+(m)[/tex]

[tex]\frac{1}{3}(9-6m)+\frac{1}{4}(12m-8)=m+1[/tex]

The sum of the given expression is (m+1).

Answer:

The answer is 50 students

Step-by-step explanation:

4 1/2  + 8 3/4

4+8 = 12

1/2 + 3/4 = 2/4 + 3/4 = 5/4 = 1 1/4

12 + 1 1/4 = 13 1/4

 Answer is C

Final answer:

To find the number of patients who had all three complaints (fever, stomach issues, and injury), we can use a Venn diagram. From the given information, we determine that 30 patients had all three complaints.

Explanation:

To find the number of patients who had all three complaints, we can use a Venn diagram. Let's start with the information given:

To determine the number of patients who had all three complaints, we need to find the overlapping region in the Venn diagram. From the given information, we can determine the following:

Therefore, the number of patients who had all three complaints is 30.

Final answer:

To find out how many patients had all three complaints of fever, stomach pain, and injury, we used the principle of inclusion-exclusion and found that 25 patients had all three complaints.

Explanation:

To determine how many patients had all three complaints (fever, stomach pain, and injury) at the hospital, we can use the principle of inclusion-exclusion from combinatorics.

First, we add the number of people with each complaint:

People with fever: 70

People with stomach pain: 50

People with injury: 30

According to the inclusion-exclusion principle:

Total with all complaints = (People with fever) + (People with stomach pain) + (People with injury) - (People with fever and stomach pain) - (People with fever and injury) - (People with stomach pain and injury) + (People with all three complaints)

Since all 100 patients had at least one complaint, and assuming the least number of people with multiple complaints, we minimize the terms (People with fever and stomach pain), (People with fever and injury), and (People with stomach pain and injury). The minimum number for all these combined categories is the sum of individual complaints minus the total number of patients, which is (70 + 50 + 30) - 100 = 50.

Therefore, if there were no people with all three complaints, the total with any two complaints would be 50. However, this number includes people with all three complaints three times (once for each pair of complaints). To correct this, we subtract twice the number of people with all three complaints to get the true number of people with exactly two complaints:

50 - 2*(People with all three complaints) = Total with exactly two complaints

If there are no people with exactly two complaints, then this means that all 50 are those with all three complaints:

50 - 2*(People with all three complaints) = 0

Solving for (People with all three complaints), we get:

(People with all three complaints) = 50 / 2

(People with all three complaints) = 25

This result suggests that 25 patients had all three complaints of fever, stomach pain, and injury.

Answer:

4:1

Step-by-step explanation:

We are given that

Point L(-2,5) and M(2,-3).

Point Q([tex]\frac{6}{5},\frac{-7}{5})[/tex] partitions LM .

We have to find the ratio in which Q divides the LM.

Let point Q divides the LM in the ratio K:1.

Section formula;[tex]x=\frac{m_1x_2+m_2x_1}{m_1+m_2},y=\frac{m_1y_2+m_2y_1}{m_1+m_2}[/tex]

Substitute the values in the given formula  then we get

[tex]\frac{6}{5}=\frac{2k-2}{k+1}[/tex]

[tex]6k+6=10k-10[/tex]

[tex]6+10=10k-6k[/tex]

[tex]16=4k[/tex]

[tex]k=\frac{16}{4}=4[/tex]

Hence, the point Q divides the LM in the ratio 4:1.

Twice the sum of a number and 3 is the same as 5 subtracted from the number. Then the number will be -11.

Sum refers to the addition of terms, while subtraction means removal.

Let the number be x

Following the given information:

sum of a number and 3 = x+3

Expression 1

Twice the sum of a number and 3 =2(x+3)

Expression 2

5 subtracted from the number=x-5

On equating both the expressions as follows:

2(x+3)=x-5

Solving the equation to get the value of x:

2x+6=x-5

2x-x=-5-6

x=-11

Thus, the number is -11.

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The value of the multiplication of the fractions will be equal to 27 / 70.

Multiplication is the process of determining the product of two or more numbers in mathematics. A product, or an expression that specifies factors to be multiplied, is what happens when you multiply two numbers in mathematics

Mathematical symbols can be used to represent numbers (constants), variables, operations, functions, brackets, punctuation, and grouping. They can also denote the logical syntax's operation order and other properties.

Given that the fractions are 3/7 and 9/10. The multiplication of the number will be calculated as,

M = 3 / 7 x 9 / 10

M = 27 / 70

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