MATHEMATICS HIGH SCHOOL

If Adam Ct. is perpendicular to Charles st. and Charles St. is parallel to Edward Rd. what must be true?A. Adam ct. is perpendicular to Edward Rd.
B. Adam ct. is parallel to Edward La.
C. Bertha Dr. is parallel to Charles st.
D. Dana la. is perpendicular to Charles st.

Answers

Answer 1
Answer:

Answer:

A. Adam ct. is perpendicular to Edward Rd.

Step-by-step explanation:

We are given that,

Adam Ct. is perpendicular to Charles St.

Charles St. is parallel to Edward Rd.

So, we get the situation shown below.

It is required to find the relation between Adam Ct. and Edward Rd.

As, we can see that,

Charles St. being parallel to Edward Rd. and Adam Ct. being perpendicular to Charles St.

We get,

Adam Ct. is perpendicular to Edward Rd.

Hence, option A is correct.
Answer 2
Answer:

Adam Ct and and Edward Rd must be parallel! (answer B). Take a look at the attachment: i drew the plan according to what we know).

(options C and D can also be true, but we don't know enough about the city to verify this)

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Which function represents a horizontal shift of ƒ(x) = 5(2)^3x by 4 units to the right?a. y = 0
b. y = 3
c. y = 4
d. y = 5

Answers

General Idea:

Say if f(x) is the parent function, then f(x-c) represents transformation described as horizontal translation or shift of f(x) by ' c ' units to the right.

Applying the concept:

Here we are given a function f(x)=5(2)^(3x), after the transformation of horizontal shift of 4 units to the right, the function will be given as below:

f(x)=5(2)^(3(x-4))=5(2^(3))^(x-4)=5(8)^(x-4) \n or\n f(x)=5(2)^(3x-12)

Need help please answer

Answers

Simple....

1.)5 x^(2) y √(2y) (Simplify the radical by breaking the radicand up into a product of known factors)

2.)7 n^(2) √(10mn)  (Simplify the radical by breaking the radicand up into a product of known factors)

Thus, your answer.

Which literal equations are equivalent to p = mv?Choose all answers that are correct.

A. m= p/v
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C. v = m/p
D. v = p/m

Answers

B and D because it doesnt matter how you write the equation you still get the same answer, 

don't forget to rate my answer 5 stars and thank me

I'm having a hard time with this one solve for y 3y+7=28?

Answers

3y+7=28     Change 7 to right
3y = 28 - 7   Do subtraction
3y = 21        Divide both sides by 3
y = 7             Get result
3y+7=28\n 3y=21\n y=7

Why might someone choose to use the the y-intercept and the slope to graph a line?

Answers

For this case the generic equation of the line is given by:

y = mx + b

Where,

m: slope of the line

b: intersection with the y axis.

To graph a line it is necessary to know the values of m and b.

Answer:

y = mx + b

You need to know m and b to graph the function completely.

For this reason, someone would choose to use the y-intercept and the slope
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If U=pi(r+h),find r when U=16 1/2 and h=2
solve this question by taking the value of pi 22/7

Answers

U=π(r+h)
r+h=U/π
r=U/π  - h

Data: 
U=16  1/2=16  +  1/2=(16*2+1)/2=33/2
h=2
π=22/7

Then: 
r=U/π  - h
r=(33/2)/(22/7)   -   2
r=(33*7)/(2*22)   -   2
r=231 /44   -   2
r=(231-2*44)/ 44
r=(231-88)/44
r=143/44   =   (3*44  + 11)/44=3  11/44

Answer: r=143/44      or    3  11/44
U =  π* (r + h )   [ : π

(U)/( \pi ) = r + h \n \n r = (U)/( \pi ) - h \n \n r = (16,5)/( \pi ) - 2 \n \n r = (165)/(10) : (22)/(7) - 2 \n \n r = (33)/(2) * (7)/(22) - 2 \n \n r = (3)/(2) * (7)/(2) - 2 \n \n r = (21)/(4) - 2 = 5,25 - 2 = 3.25 Answer r = 3,25
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