(B) sophisticated

 (E) contextualize a central theory

✅

 Lent Sofie one of her extra swimsuits.

 Ben used his hat as a pawn.

 Paul had charged the solar charger beforehand.

 They found the missing volleyball in the storage building's loft.

✅

 C) By preserving it with salt

✅

 C) shifting responsibility for the costs of recycling

✅

 A) It is very old

 The best description of Jim Gilmore's appearance based on the passage is: B) Short and dark with a big mustache and big hands.

✅

 To find the width of the rectangular garden, let's denote the width as w (feet), and the length as l (feet). We know that the length is four times the width, so l = 4w.

The formula for the perimeter of a rectangle is P = 2*(l + w). Since we know the perimeter P is 60 feet, we can write the equation as follows:

60 = 2*(l + w)

Now, substitute l = 4w into the equation:

60 = 2*(4w + w)

Now, let's simplify the equation:

60 = 2*(5w)

Next, divide both sides by 2 and 5:

30 = 5w

Finally, divide both sides by 5 to find the width:

w = 6 feet

So, the width of the garden is 6 feet.

Width: 6 feet

 A) degree to which a friendship has blossomed

✅

 B) Juxtapose two peoples' sentiments

✅

 To answer this question, we need to consider the given statements and their implications.

1. All members of the chess team are also members of the robotics club. This means that if someone is on the chess team, they must also be in the robotics club.

2. No members of the basketball team are members of the chess team. This means that if someone is on the basketball team, they cannot be on the chess team.

Now, let's examine the given options:

(A) If Izak is in the robotics club, then he is not on the basketball team. Since we know from the second statement that no members of the basketball team are members of the chess team, and if Izak is in the robotics club (which is the chess team according to the first statement), then he must not be on the basketball team.

(B) If Jerry is in the robotics club, then he is on the chess team. This contradicts the second statement that no members of the basketball team are members of the chess team, because we don't have any information about Jerry being on the basketball team.

(C) If Lisa is on the basketball team, then she is not in the robotics club. This contradicts the first statement that all members of the chess team are also members of the robotics club, because we don't know that Lisa is on the chess team.

(D) If Sanjit is on the chess team, then he is on the basketball team. This contradicts the second statement that no members of the basketball team are members of the chess team, because we don't have any information about Sanjit being on the basketball team.

(E) If Seong-Jin is not in the robotics club, then he is not on the chess team. This is correct! Since all members of the chess team are also members of the robotics club, if someone is not in the robotics club, then they cannot be on the chess team.

So, the correct answer is E. If Seong-Jin is not in the robotics club, then he is not on the chess team.

 The Mother is in Mexico.

Here's the reasoning:

1. We know the Grandmother has the gold doubloon and is either in Denmark or Canada. If she is in Denmark (as per the question), then the gold doubloon is in Denmark.
2. We know the Son is not in Denmark, and he neither has the gold doubloon nor the silver watch. Since the gold doubloon is in Denmark, the Son cannot be in Canada because the Grandmother is there. So, the Son must be in one of the other countries (Mexico, Britain, or Egypt).
3. If the Son is in Britain, then the broken sword would also be there, contradicting statement 1. Therefore, the Son cannot be in Britain.
4. If the Son is in Egypt, then the family tree (which is in Egypt) would also be with the Son, contradicting the fact that the Mother has the family tree. Therefore, the Son cannot be in Egypt.
5. Thus, the Son must be in Mexico. This means the Mother cannot be in Denmark because the gold doubloon is there with the Grandmother. So, the Mother must be in Mexico.

✅

 ▲ ◆ ★

 ★. Lucky the rabbit's owner, Vidya, schedules a minor surgery for him due to the growth of a benign tumor.
●. Lucky is put under anesthesia, and Dr. Hahn starts the procedure.
◆. Dr. Hahn washes his hands thoroughly in preparation for the surgery.
▲. The veterinary assistant calls Lucky's owner to inform her that the surgery was successful.

✅

 ▲, ★, ●, ◆

 ● ▲ ★ ● ◆

Explanation:

1. First, we need to retrieve the current password from the user's account (●).
2. Then, the user will be asked to input the current password and the new password (★).
3. If the inputted current password doesn't match the stored one, the user will be notified to try again (▲).
4. If the current password is correct, the new password will be stored, and the user will be notified that the password has been successfully set (★).
5. Finally, if the new password is stored successfully, the program ends (◆).

 To find the value of n, we first need to determine how many verses the 7th student wrote beyond their rank. Since the 7th student wrote 20 verses and the 7th rank implies 6 other students before them, they wrote twice the number of students before them, or 2*6 = 12 additional verses.

Now, we know that the 7th student wrote a total of n + 12 verses. However, since they were supposed to write n verses according to the instructions, the remaining verses should be their class rank-based verses. So, the number of verses they wrote based on their rank is n.

Therefore, to find the value of n, we can set up the equation:

n + 12 = n + 2*(number of students before 7th rank)

Since there are 30 students in total, the number of students before the 7th rank is 30 - 7 = 23.

Substituting this into our equation:

n + 12 = n + 2*23

Solving for n:

n = 23 - 12

So, the value of n is 11.

 To find the value of 4 ◘ 3, we substitute x = 4 and y = 3 in the given operation ◘, which is defined as x ◘ y = 2x - 3y + 1.

So, 4 ◘ 3 = 2(4) - 3(3) + 1

Now, perform the multiplication and addition:

4 ◘ 3 = 8 - 9 + 1

Add the numbers:

4 ◘ 3 = 6

Therefore, the value of 4 ◘ 3 is 6.

In summary, 4 ◘ 3 = 6.

 To find the time it takes John to travel to the park, we use the formula Time = Distance / Speed.

Time = 60 miles / 30 mph = 2 hours.

So, it will take John 2 hours to reach the park.

 To solve this problem, we need to find the three-digit integers greater than 99 and less than 200 that have exactly one duplicate digit. Since the digit in the hundreds' place duplicates the digit in the ones' place, we can rearrange these numbers as follows:

1. First, we list the unique digits from 0 to 9: 0, 1, 2, 3, 4, 5, 6, 7, 8.

2. Next, we pair each unique digit with itself to create the duplicate pairs: 00, 11, 22, 33, 44, 55, 66, 77, 88.

3. Now, we can create the three-digit numbers by placing each unique digit in the tens' place and the corresponding duplicate digit in the ones' place. The resulting numbers must be greater than 99 and less than 200, so the unique digits should be greater than or equal to 3.

4. For each unique digit greater than or equal to 3, we create a three-digit number:

   - For the digit 3: 330, 331, 332, 333, 334, 335, 336, 337, 338 (10 numbers)
   - For the digit 4: 440, 441, 442, 443, 444, 445, 446, 447, 448 (10 numbers)
   - For the digit 5: 550, 551, 552, 553, 554, 555, 556, 557, 558 (10 numbers)
   - For the digit 6: 660, 661, 662, 663, 664, 665, 666, 667, 668 (10 numbers)
   - For the digit 7: 770, 771, 772, 773, 774, 775, 776, 777, 778 (10 numbers)
   - For the digit 8: 880, 881, 882, 883, 884, 885, 886, 887, 888 (10 numbers)

5. Finally, we add the number of these three-digit numbers for each unique digit greater than or equal to 3:

   Total number of integers = 10 (for digit 3) + 10 (for digit 4) + 10 (for digit 5) + 10 (for digit 6) + 10 (for digit 7) + 10 (for digit 8) = 60 numbers.

There are 60 integers greater than 99 and less than 200 that have exactly one duplicate digit.

 C) Andrés was not an employee of Duluth Paper this year.

Here's the reasoning:

1. The first statement says that all employees of Duluth Paper received a bonus this year.
2. The second statement says that Andrés did not receive a bonus this year.
3. Since we know that Andrés is an employee of Duluth Paper (from the context), and according to the first statement, all employees of Duluth Paper received a bonus, if the first statement were true, then Andrés would have received a bonus, which contradicts the second statement.
4. Therefore, it must be that Andrés was not an employee of Duluth Paper this year (the third option) for both statements to be true.

 The author includes the detail "He liked it about her face because it was so jolly" to show that Jim has noticed Liz Coates. This suggests that Jim has observed and appreciated Liz's appearance, specifically her jolly face, indicating that he has noticed her.

A) the frequency with which he thought of her (This is not mentioned in the passage.)
B) his fondness for her cooking (This is not mentioned in the passage.)
C) the whiteness of her teeth (This is mentioned, but it is not a detail that shows Jim has noticed Liz, it's more about his personal preference.)
D) the arrangement of her hair (This is not mentioned in the passage.)

Final Answer: A) is not correct.
B) is not correct.
C) is not the detail that shows Jim has noticed Liz, but it is a detail he finds appealing.
D) is not mentioned in the passage.

Correct Answer: A) (This is not the correct answer as stated in the passage, but it is the detail that the question is asking for, even though it is not stated explicitly in the passage.)

 (C) If Mary can bake, then she is Lisa's sister

Here's the reasoning:

1. The statement "All of Lisa's sisters can bake" means that if someone is Lisa's sister, then they can bake.
2. If we know that Mary can bake, then we are given information that fulfills the condition of being Lisa's sister (as stated in the given statement). Therefore, Mary is Lisa's sister.
3. The other options do not follow logically from the given statement:
   - A) If Jane cannot bake, it doesn't necessarily mean she is not Lisa's sister.
   - B) If Sarah can bake, it doesn't mean she is not Lisa's sister.
   - D) If Emma is not Lisa's sister, it doesn't mean she cannot bake (since we don't know anything about Emma).
4. Since option C logically follows from the given statement, that is the correct answer.

 To solve this, let's first eliminate locations for the daughter based on the given information:

1. The son isn't in Denmark, so the daughter can't be in Denmark either (as it's the only other location where the son isn't).
2. The mother has the silver watch but isn't in Mexico, so the daughter can't be in Mexico either.
3. Now we know that the daughter can't be in Denmark, Mexico, or Egypt (because those are the locations of the family members with specific items, and the daughter doesn't have the oceanic map).
4. The grandmother has the gold doubloon and could be in Denmark or Canada. Since the daughter can't be in Denmark, the grandmother can't be there either because she has the gold doubloon, and we know the son doesn't have it. So, the grandmother must be in Canada.
5. The remaining locations for the daughter are Britain and Canada.
6. Since the son isn't in Denmark, the father also can't be in Denmark because the son and the father are different people. So, the father must be in Canada as well (to avoid having both the father and the grandmother in Denmark).
7. This leaves Britain as the only remaining location for the daughter.

The answer: The daughter is in Britain.