name
date
homeroom
ms.clarke-davis/ms.jacobs/ms.castro
lesson 4.15-homework
below is a graph displaying toms trip to the grocery store. on his way there he walked and took a bus.
toms trip to the grocery store
(graph: distance from home (in miles) on y-axis, time from 7:00 - 7:35 on x-axis, showing toms trip with segments of different slopes)
step a: label the section(s) that tom is walking with a w. explain your choice(s).

step b: label the section(s) that tom could be riding a bus. explain your choice(s).

step c: for how many minutes was tom standing still? explain how you know.

step d: what was toms average velocity?

Question

name
date
homeroom
ms.clarke-davis/ms.jacobs/ms.castro
lesson 4.15-homework
below is a graph displaying toms trip to the grocery store. on his way there he walked and took a bus.
toms trip to the grocery store
(graph: distance from home (in miles) on y-axis, time from 7:00 - 7:35 on x-axis, showing toms trip with segments of different slopes)
step a: label the section(s) that tom is walking with a w. explain your choice(s).

step b: label the section(s) that tom could be riding a bus. explain your choice(s).

step c: for how many minutes was tom standing still? explain how you know.

step d: what was toms average velocity?

Accepted Answer

### Step A
# Explanation:
## Step1: Identify walking sections
Walking is slower, so sections with smaller slope (less steep) are walking. From Home to ~7:03, 7:07 - 7:19, 7:25 - 7:35 (estimate grid). Label these "W".
## Step2: Explain
Walking speed is lower, so distance vs time has smaller slope (less distance per time) than bus (steeper). These sections have gentle slopes, so Tom walks here.

# Answer:
Sections with gentle (small slope) distance - time graph (e.g., Home to ~7:03, 7:07 - 7:19, 7:25 - 7:35) are labeled "W" because walking is slower (smaller slope) than bus - riding.

### Step B
# Explanation:
## Step1: Identify bus sections
Bus is faster, so steeper slope sections. From ~7:03 - 7:07, 7:19 - 7:25 (steeper slopes). Label these as bus - riding.
## Step2: Explain
Bus speed is higher, so distance increases faster (steeper slope) than walking. These sections have steep slopes, so Tom rides bus here.

# Answer:
Sections with steep (large slope) distance - time graph (e.g., ~7:03 - 7:07, 7:19 - 7:25) are labeled for bus - riding because bus is faster (larger slope) than walking.

### Step C
# Explanation:
## Step1: Identify still sections
Still means distance doesn't change (horizontal line). From ~7:03 - 7:07? Wait, no: horizontal parts. Let's check time: 7:05 - 7:07? Wait, graph: horizontal from ~7:03 - 7:05 (2 minutes), and 7:20 - 7:25 (5 minutes)? Wait, grid: each vertical line is 5 minutes? Wait, x - axis: 7:05, 7:10, 7:15, 7:20, 7:25, 7:30, 7:35. Horizontal sections: between 7:03 - 7:05 (2 minutes) and 7:20 - 7:25 (5 minutes)? Wait, no, let's count. First horizontal: from ~7:03 to 7:05 (2 minutes), then 7:20 - 7:25 (5 minutes). Wait, total still time: 2 + 5 = 7? Wait, no, maybe I misread. Wait, the graph: first horizontal after home: from ~7:03 to 7:05 (2 minutes), then another horizontal from 7:20 to 7:25 (5 minutes). Wait, let's check the x - axis grid. Each small square: 1 minute? So from 7:05 to 7:07? Wait, the first horizontal: after the first slope, it's horizontal until 7:05? Wait, the problem says "standing still" is when distance doesn't change (horizontal line). So find all horizontal segments. Let's see:

- First horizontal: from ~7:03 to 7:05 (2 minutes)
- Second horizontal: from 7:20 to 7:25 (5 minutes)

Wait, no, maybe the first horizontal is from 7:03 to 7:05 (2 min), and the second from 7:20 to 7:25 (5 min). Wait, total still time: 2 + 5 = 7? Wait, no, maybe I made a mistake. Wait, the x - axis: 7:05, 7:10, etc. Let's count the minutes between horizontal lines. First horizontal: between ~7:03 and 7:05 (2 minutes). Second horizontal: between 7:20 and 7:25 (5 minutes). Wait, but maybe the first horizontal is from 7:05 to 7:07? No, the graph: Home, then slope, then horizontal (7:05 - 7:07? Wait, the label is 7:05, 7:10. So each vertical line is 5 minutes? No, the grid has small squares. Let's assume each small square is 1 minute. So from 7:05 to 7:07 (2 minutes) is horizontal, and 7:20 to 7:25 (5 minutes) is horizontal. Wait, but the answer is likely 2 + 5 = 7? Wait, no, maybe the first horizontal is 2 minutes (7:03 - 7:05) and the second is 5 minutes (7:20 - 7:25), total 7 minutes. Wait, but let's check again. The graph:

- From Home to ~7:03: slope (walking)
- ~7:03 - 7:05: horizontal (still, 2 minutes)
- 7:05 - 7:07: slope (bus, 2 minutes)
- 7:07 - 7:19: slope (walking, 12 minutes)
- 7:19 - 7:20: slope (bus, 1 minute)
- 7:20 - 7:25: horizontal (still, 5 minutes)
- 7:25 - 7:35: slope (walking, 10 minutes)

Wait, no, the time between 7:20 and 7:25 is 5 minutes (horizontal), and between ~7:03 and 7:05 is 2 minutes (horizontal). So total still time: 2 + 5 = 7 minutes.

## Step2: Explain
Still time is when distance doesn't change (horizontal line on distance - time graph). We find horizontal segments, calculate their time length (end time - start time) and sum. First horizontal: 7:05 - 7:07? Wait, no, maybe the first horizontal is from 7:03 to 7:05 (2 minutes) and the second from 7:20 to 7:25 (5 minutes). So 2 + 5 = 7 minutes.

# Answer:
Tom was standing still for 7 minutes (e.g., 2 minutes from ~7:03 - 7:05 and 5 minutes from 7:20 - 7:25). We know because distance doesn't change (horizontal line) during these times, so he's not moving (standing still).

### Step D
# Explanation:
## Step1: Determine total distance and time
Total distance: from Home to Store, distance is ~1.7 miles (from graph, y - axis at 7:35 is ~1.7 miles). Total time: from Home (let's say 7:00) to 7:35, so 35 minutes.
## Step2: Calculate average velocity
Average velocity $v=\frac{	ext{total distance}}{	ext{total time}}$. So $v = \frac{1.7	ext{ miles}}{35	ext{ minutes}}\approx0.0486	ext{ miles per minute}$ or convert to miles per hour: $0.0486	imes60\approx2.92$ mph. Wait, but let's check the graph. The final distance is ~1.7 miles (from y - axis, Store is at ~1.7). Total time: from Home (7:00) to 7:35, 35 minutes. So average velocity $=\frac{1.7}{35}\approx0.0486$ miles per minute (or ~2.92 mph).

## Step3: Explain
Average velocity is total displacement (distance, since it's one - way) divided by total time. We find total distance from graph (y - axis at end) and total time from x - axis (start to end time).

# Answer:
Tom's average velocity is $\frac{	ext{Total Distance}}{	ext{Total Time}}$. From graph, total distance $\approx1.7$ miles, total time $ = 35$ minutes. So average velocity $=\frac{1.7}{35}\approx0.049$ miles per minute (or $\approx2.94$ miles per hour).

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QUESTION IMAGE

Question

Explanation:

Step A

Step1: Identify walking sections

Step2: Explain

Step1: Identify bus sections

Step2: Explain

Step1: Identify still sections

Step2: Explain

Answer:

Step B