Looking up, Juan sees two hot air balloons in the sky as shown. He determines that the lower hot air balloon is

First, we can draw a diagram to visualize the situation:

```
/|
/ |
/ |
/ |
/ |
/ |
b / | a
/ |
/ |
/ |
/ |
/___________|
700m 1050m
```

We can see that we have a right triangle formed by the vertical line, the line connecting the two hot air balloons, and the line connecting the balloon on the left to the point directly beneath the balloon on the right.

Let's label the lengths of the sides of this triangle:
- The length of the vertical line connecting the two hot air balloons is a.
- The length of the line connecting the balloon on the left to the point directly beneath the balloon on the right is b.
- The distance between the two hot air balloons is 1050 - 700 = 350 meters.

Now, we need to find the lengths of the sides a and b.

Using trigonometry, we can relate the angles and sides of a triangle. In this case, we can use the tangent function.

For the left triangle:
tan(38°) = b/a

For the right triangle:
tan(26°) = b/350

We can rearrange both equations to solve for b:
b = a*tan(38°)
b = 350*tan(26°)

Setting these two equations equal to each other, we have:
a*tan(38°) = 350*tan(26°)

Now, we can solve for a:
a = (350*tan(26°))/tan(38°)

Plugging this value of a back into one of the equations for b, we can solve for b:
b = (350*tan(26°))/tan(38°) * tan(38°)

The difference in height between the two balloons is b. So, the answer is approximately b meters higher.

Using a calculator, we can find:
a ≈ 299.7 meters
b ≈ 226.5 meters

Therefore, the balloon on the right is approximately 226.5 meters higher than the balloon on the left.

NOPE

I apologize for the mistake. Let's try to solve the problem again.

In this case, we have two right triangles formed by the vertical line, the line connecting the two hot air balloons, and the ground.

For the left triangle:
The distance from the left balloon to the point directly beneath the right balloon is "b".
The distance from the left balloon to the vertical line is "a".

For the right triangle:
The distance from the right balloon to the point directly beneath the left balloon is also "b".
The distance from the right balloon to the vertical line is "c".

We are given the values of "a" and "c":
a = 700 meters
c = 1050 meters

To find the height difference, we need to find the difference between the lengths of "b" in the two triangles.

Using trigonometry, we can relate the angles and sides of a triangle. In this case, we can use the tangent function.

For the left triangle:
tan(38°) = b/a

For the right triangle:
tan(26°) = b/c

We can rearrange both equations to solve for b:
b = a * tan(38°)
b = c * tan(26°)

Now, we can substitute the given values to find the lengths of "b":
b_left = 700 * tan(38°)
b_right = 1050 * tan(26°)

Finally, we can find the difference in height between the two balloons:
height_difference = b_right - b_left

Using a calculator, we can find:
b_left ≈ 413.7 meters
b_right ≈ 489.6 meters

Therefore, the balloon on the right is approximately 489.6 - 413.7 = 75.9 meters higher than the balloon on the left.

WRONG

Apologies for the confusion. Let's try solving the problem again.

We have two right triangles formed by the vertical line, the line connecting the two hot air balloons, and the ground. Let's denote the height difference between the two balloons as h.

In the left triangle, we have:
tan(38°) = h/a
a = h/tan(38°)

In the right triangle, we have:
tan(26°) = h/c
c = h/tan(26°)

We are given the values of c and a:
c = 1050 meters
a = 700 meters

Now we can set up an equation to find h:

h/tan(38°) = 700/tan(26°)

Cross-multiplying gives us:
h * tan(26°) = 700 * tan(38°)

Dividing both sides by tan(26°), we get:
h = (700 * tan(38°)) / tan(26°)

Using a calculator, we find:
h ≈ 1114.9 meters

Therefore, the balloon on the right is approximately 1114.9 - 700 = 414.9 meters higher than the balloon on the left.