Cheap Joe’s Hours

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5. Working alone, Joe can mow a large lawn in

Ask: 5. Working alone, Joe can mow a large lawn in 3 hours, and Kevin can mow it in 4 hours. Suppose that
they work together for one hour and then Kevin leaves. How long will it take Joe to finish the job?​

Answer:

It will take 5 hours for Joe to maw the lawn.

If Joe drives 50 mph for 0.5 hours and then

Ask: If Joe drives 50 mph for 0.5 hours and then 60 mph for 1.5 hours, then how far did he drive?

Word Problem – Distance, Velocity, Time

Answer:

Dt = 140 miles

Step-by-step explanation:

Lets jot down the given in the problem in order to solve it.

Given:

First 0.5 hours of the Drive:

V₁ = 50 mph

t₁ = 0.5 hours

Second 1.5 hours of the Drive:

V₂ = 60 mph

t₂ = 1.5 hours

Required:

Total Distance = Dt

Solution:

The problem requires us to know the total distance that was driven by Joe.  

Before we solve the problem lets discuss first how distance, time and velocity correlates with each other.

Distance is a numerical measurement of how far apart objects or points are. It may refer to a physical length or an estimation based on other criteria. ( https://brainly.ph/question/1122494 )

Time is a component quantity of various measurements used to sequence events, to compare the duration of events or the intervals between them, and to quantify rates of change of quantities in material reality

Velocity is the rate of change of its position with respect to a frame of reference, and is a function of time. Velocity is equivalent to a specification of an object’s speed and direction of motion.

Velocity can be measured by using distance and time, It is given by the expression below:

V = [tex]frac{d}{t}[/tex] or Velocity is equal to distance divided by time.

_

Going back to the required of the problem, In order to solve the give problem we first need to compute for the distance covered by Joe within the first 0.5 hours and then add the distance covered by Joe within the next 1.5 hours of Joe’s drive.

For the first 0.5 hours the distance covered by Joe is given by the equation below:

V₁ = d₁ / t₁

Since we only have the velocity of Joe’s car and the time it took to cover the ceratin distance, we will need to equate the above equation to distance given below:

d₁ = V₁ / t₁

Substituting the values:

d₁ = 50 mph/ 0.5 h

Hence,

d₁  = 100 meters

same case for the second distance covered with in the next 1.5 hours of Joe’s drive, the formula will be

d₂ = V₂ / t₂

d₂ = 60 mph / 1.5 hours

d₂ = 40 miles

In order to know the total distance covered by Joe, we will add d₁ & d₂

Dt = d₁ + d₂

Dt = 100 miles + 40 mWord Problem – Distance, Velocity, Time

Answer:

Step-by-step explanation:

Lets jot down the given in the problem in order to solve it.

Given:

First 0.5 hours of the Drive:

V₁ = 50 mph

t₁ = 0.5 hours

Second 1.5 hours of the Drive:

V₂ = 60 mph

t₂ = 1.5 hours

Required:

Total Distance = Dt

Solution:

The problem requires us to know the total distance that was driven by Joe.  

Before we solve the problem lets discuss first how distance, time and velocity correlates with each other.

Distance is a numerical measurement of how far apart objects or points are. It may refer to a physical length or an estimation based on other criteria. ( https://brainly.ph/question/1122494 )

Time is a component quantity of various measurements used to sequence events, to compare the duration of events or the intervals between them, and to quantify rates of change of quantities in material reality

Velocity is the rate of change of its position with respect to a frame of reference, and is a function of time. Velocity is equivalent to a specification of an object’s speed and direction of motion.

Velocity can be measured by using distance and time, It is given by the expression below:

V = [tex]frac{d}{t}[/tex] or Velocity is equal to distance divided by time.

_

Going back to the required of the problem, In order to solve the give problem we first need to compute for the distance covered by Joe within the first 0.5 hours and then add the distance covered by Joe within the next 1.5 hours of Joe’s drive.

For the first 0.5 hours the distance covered by Joe is given by the equation below:

V₁ = d₁ / t₁

Since we only have the velocity of Joe’s car and the time it took to cover the ceratin distance, we will need to equate the above equation to distance given below:

d₁ = V₁ / t₁

Substituting the values:

d₁ = 50 mph/ 0.5 h

Hence,

d₁  = 100 meters

same case for the second distance covered with in the next 1.5 hours of Joe’s drive, the formula will be

d₂ = V₂ / t₂

d₂ = 60 mph / 1.5 hours

d₂ = 40 miles

In order to know the total distance covered by Joe, we will add d₁ & d₂

Dt = d₁ + d₂

Dt = 100 meters + 40 miles

Dt = 140 miles

Therefore,

The total distance covered by Joe in his driving is 140 miles.

_

#LetsStudy

Tom can do a certain job in 6 hours. (Assume

Ask: Tom can do a certain job in 6 hours. (Assume that he works at the same rate) When Tom works along with Joe, he finishes the job in 2 hours. How long will Joe take to do the same job working alone?

Answer:

3hrs

Step-by-step explanation:

[tex] frac{2}{x} + frac{2}{6} = 1 \ [/tex]

multiply both sides by LCD 6x

[tex]12 + 2x = 6x \ 4x = 12 \ x = 3[/tex]

Joe can do the job alone in 3 hrs

Joe and Luke left their school at the same time.

Ask: Joe and Luke left their school at the same time. It took Joe 2.6 hours to reach their house while it took Luke 1.9 hours. What is the difference of their travel time in seconds?

Answer:

70 seconds

Step-by-step explanation:

Joe : 2.6 hours

Like: 1.9 hours

The operation is Subtraction

Answer is 70 seconds

if Joe drives 30 mph for 0.5 hours and then

Ask: if Joe drives 30 mph for 0.5 hours and then 80 mph for 2 hours, then how far did he drive?

Answer:
175 miles

explanation:
30 mph for 0.5 hours = he travelled 15 miles
80 mph for 2 hours = he travelled 160 miles
so 15 + 160 = 175 miles

Joe drives 120 miles in 2 hours. What is his

Ask:
Joe drives 120 miles in 2 hours. What is his average of speed

Answer:

60 hours

Step-by-step explanation:

Speed = Distance ÷ Time

             120  ÷ 2 = 60 hours

           

Hope it helps

# CarryOnLearning

12. How long would it take Joe to complete the

Ask: 12. How long would it take Joe to complete the job alone?
A. 32 hours
C. 72 hours
B. 96 hours
D. 24 hours​

Answer:

A

Step-by-step explanation:

I think the correct answer is letter A

If Joe drives 30 mph for 0.5 hours and then

Ask: If Joe drives 30 mph for 0.5 hours and then 80 mph for 2 hours, then how far did he drive?

the possible answer is 10hours

How long would it take Joe to complete the job

Ask: How long would it take Joe to complete the job a
A. 32 hours
B. 96 hours​

Answer:

A po

Tama ba? de sure Sana tama

Jim and joe, working together can print this preboard in

Ask: Jim and joe, working together can print this preboard in 6 and 2/3 hours. jim became intoxicated with alcohol after 3 hours of working with joe, and joe finished the printing alone in 8.25 hours. how long will joe do the printing alone

Answer:

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