Shawn and Dorian rented bikes from two different rental shops. The prices in dollars, y, of renting bikes from the two different shops for x hours is shown. Shop Shawn used: y = 10 + 3.5x Shop Dorian used: y = 6x If Shawn and Dorian each rented bikes for the same number of hours and each paid the same price, how much did each pay for the rental?

Answers

Answer 1

Answer: You need to find the solution to the system of equations:

y = 10 + 3.5x
y = 6x

Then, both right sides are equal to each other:

6x = 10 +3.5x

6x - 3.5x = 10

2.5x = 10

x = 10/2.5 = 4

And:

y = 6(4) = 24.

Answer: They both rented the bikes for 4 hours and paid $ 24.

Answer 2

Answer: If you would like to know how much did each pay for the rental, you can calculate this using the following steps:

y = 10 + 3.5 * x
y = 6 * x
_____________
10 + 3.5 * x = 6 * x
10 = 6 * x - 3.5 * x
10 = 2.5 * x
x = 10 / 2.5
x = 4 hours

y = 6 * x = 6 * 4 = 24 dollars

y = 10 + 3.5 * x = 10 + 3.5 * 4 = 24 dollars

They both paid 24 dollars for 4 hours.

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The y-intercept of the line whose equation is 2x + 5y = 8 is 8 4 8/5

Answers

to get y- intercept
put x=0 in the equation
2(0) +5y = 8
so,, y = 8/5

Final answer:

The y-intercept of the line represented by the equation 2x + 5y = 8 is 8/5. This is determined by rewriting the equation in slope-intercept form (y = mx + b), where 'b' represents the y-intercept.

Explanation:

The subject of this Mathematics question seems to be focusing on finding the y-intercept of the equation 2x + 5y = 8. In an equation like this, formatted in the style of a linear equation (y = mx + b), the y-intercept is represented by 'b'. This intercept is the point at which the line crosses the y-axis in a Cartesian plane.

If we rearrange the equation to the format y = mx + b, we get y = -2/5*x + 8/5. Therefore, the y intercept of the equation 2x + 5y = 8 is 8/5, which is the 'b' in our slope-intercept form equation.

Learn more about Y-Intercept Calculation here:

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PLSSS HELPPPP I WILLL GIVE YOU BRAINLIEST!!!!!!A sequence is shown.
3, 9, 13, 33, 51, ...
Which of the following functions can be used to find the nth tern of this sequence?
a.f(n)=n^2+2

b.f(n)=2n^2+1

c.f(n)=2n+1

d.f(n)=3n^2

Answers

Answer:

b. f(n) = 2n^2 + 1

Step-by-step explanation:

Thanks for explaining the nth thing to me. It all makes sense now :'D

I'll be honest I think you're at least a grade level above me in math.

It's b. because

f(n) = 2(1)^2 + 1

2(1) + 1

2 + 1 = 3 (first term)

f(n) = 2(2)^2 + 1

2(4) + 1

8 + 1 = 9 (second term) ...and so on. :)

A sample of 40 batteries is taken from a case of 400. Thirty-seven of the batteries in the sample are good, and three are defective. Let p= the probability that a battery case is still good. Which of the following is NOT a possible value for p?A. 0.5
B. 0.75
C. 0.9
D. 0.925
E. 1

Answers

The answer is option E i.e., 1 because we know that there are 3 defective batteries in the case so the probability will never be 1 for this case.

Multiply 12x17 using the Russian peasant method

Answers

[[work is attached]]

Steps:
1) Divide the first number by 2 until you get to 1 (ignore decimals)
2) Multiply the second number so you have as many answers as the first
3) Cross out answers in the second column that match with an even answer in the first
4) Add the numbers that are left in the second column

Answer: 204

half double
12 17 we cut it
6 34 we cut it with a line
3 68
1 136
..........................
12 x 7= (68+136)

12 x 7= 204

Find the product (3+2i)(4+i)

Answers

Answer: $10+11i$

Step-by-step explanation:

Multiply each term inside the brackets and be aware that $i$ is just $\sqrt-1}$ . So, we are given $(3+2i)(4+i)$ :

Lets start by multiplying the outer term :

$3*4=$ $12$

Now first inner :

$3*i$ $=3i$

Now second inner :

$4*2i$ $=8i$

Now last :

$2i*i$ $=2i^2$

Now, we must simplify the last term while keeping in mind $i$ is just $\sqrt-1}$ :

$2i^2=2√(-1) ^2 = -2$

Now add up all like terms :

$(12+(-2))+(3i+8i) = 10+11i$

And that's it!

Help with writing equations.
The pictures below have the questions I need help with.

Answers

I'm sure you know how to find the slope of a line if you know 2 points
on it ... The slope is ...

(difference in y-values) / (difference in x-values) .

Right ?

OK. Each line in these tables is a point on the graph of the table.
Pick two points from the table, and you can get the slope of the line
from them.

The first table (Plan-A) has these points in it:

1 . . . . . $20.15
2 . . . . . $20.30
3 . . . . . $20.45
4 . . . . . $20.60

You want to find the equation of the line with these 4 points on it.
That means you need to find the slope and the intercept of the line.
Take any two points straight from the table. I'll use the first two:

1 . . . . . $20.15
2 . . . . . $20.30

There you have two points on the line: (1, 20.15) and (2, 20.30) .
The slope is (difference in 'y') / (difference in 'x').

Difference in 'y' = (20.30 - 20.15) = 0.15
Difference in 'x' = (2 - 1) = 1

Slope of the line = (0.15) / 1 = 0.15
(What that really means is 15 cents per minute on Plan-A.)

Now you know that the equation of the line is [ y = 0.15x + intercept ].

Can you think of a way to find the intercept ?
Remember ... every point in the table is on the line.
So why not just take one of these points in the table, put it into the part of the equation that you already have, and watch the intercept fall out ?
You could use any point at all from the table.
I'll use the 3rd one.

y = 0.15x + intercept

20.45 = 0.15(3) + intercept

20.45 = 0.45 + intercept

Subtract 0.45 from each side: 20.00 = intercept

The equation of the graph for Plan-A is Charge = 0.15(minutes) + $20.00
===============================

Plan-B:

First two points:

Difference in y-values = (8.00 - 6.50) = 1.50
Difference in x-values = (10 - 5) = 5

Slope of the line = (1.50) / (5) = .30 (30 cents per minute)
Intercept = 5.00

Charge = 0.3(minutes) + $5.00
======================================

Plan-C:

Slope = 4.50 / 10 = 0.45
Intercept = zero
=================================

Plan-D:

Slope = (16.50 - 11.00) / (30 - 20) = 5.5/10 = 0.55
Intercept = zero

In each plan, the intercept is the cost just to sign up, before you use
the phone, and then the slope is the cost for each minute of talking on it.

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