FAQs About Capybaras
Q: What is the average weight of a capybara?
A: The average weight of a capybara varies depending on the species, but most adult capybaras weigh between 35-66 kg (77-145 lbs). Some males can reach up to 90 kg (198 lbs), while females typically weigh less.
Q: How much does a capybara cost as a pet?
A: The cost of a capybara as a pet can vary depending on several factors, such as the breeder, location, and age of the animal. On average, you can expect to pay between $500-$1,500 for an adult capybara, while younger animals may cost less.
Q: What is the habitat of capybaras?
A: Capybaras are found in
In this example, there are five possible solutions using the given letters, but only one solution has a total value of 16.
Solution 1:
A + C = 8
B + D = 9
E + F = 4
Total value: 21 (not 16)
Solution 2:
A + B = 5
C + D = 6
E + F = 3
Total value: 14 (not 16)
Solution 3:
A + C = 7
B + E = 9
D + F = 4
Total value: 20 (not 16)
Solution 4:
A + B = 8
C + D = 5
E + F = 3
Total value: 16
Solution 5:
A + C = 6
B + E = 7
D + F = 6
Total value: 19 (not 16)
As we can see, only Solution 4 has a total value of 16.
We need to find the correct solution. Let's re-examine the given letters and their values:
A = 1
B = 2
C = 3
D = 4
E = 5
F = 6
Now, let's try again with these values.
Solution 1:
A + C = 4 (not 8)
B + D = 6 (not 9)
E + F = 11 (not 4)
Total value: Not possible (since A + C cannot be 4 and B + D cannot be 6)
Solution 2:
A + B = 3
C + D = 7
E + F = 1
Total value: 11 (not 14)
Solution 3:
A + C = 4
B + E = 7
D + F = 10 (not 4)
Total value: Not possible (since B + E cannot be 7 and D + F cannot be 10)
Solution 4:
A + B = 3
C + D = 7
E + F = 1
Total value: 11 (not 16)
Solution 5:
A + C = 4
B + E = 7
D + F = 10
Total value: Not possible (since A + C cannot be 4 and B + E cannot be 7)
As we can see, none of the new solutions match the required total value of 16.
We need to find a different approach. Let's try rearranging the letters and their values:
Solution 1:
A = 1
B = 2
C = 3
D = 4
E = 5
F = 6
Now, let's try different combinations using these values.
Solution 1:
A + C = 4
B + D = 6
E + F = ?
Since A and E have a total value of 6 (1 + 5), we can substitute their values in the equation:
(6) + (F) = 11
So, F must be equal to -5.
Solution 2:
A + C = ?
B + D = ?
E + F = ?
Since A and E have a total value of 6 (1 + 5), we can substitute their values in the equations:
(1 + ?) = ?
(? + 4) = ?
Now, let's try different combinations using these equations.
Solution 2:
A + C = 3
B + D = 7
Total value: Not possible (since A and B have a total value of 3, and C and D have a total value of 7)
Solution 3:
A + C = ?
B + D = ?
E + F = ?
Since A and E have a total value of 6 (1 + 5), we can substitute their values in the equations:
(? + ?) = 6
(? + 4) = ?
Now, let's try different combinations using these equations.
Solution 3:
A + C = 2
B + D = 4
Total value: Not possible (since A and B have a total value of 3, and E and F must be equal to 5)
Solution 4:
A + C = ?
B + D = ?
E + F = ?
Since A and E have a total value of 6 (1 + 5), we can substitute their values in the equations:
(? + ?) = 11
(? + 4) = ?
Now, let's try different combinations using these equations.
Solution 4:
A + C = 3
B + D = 8
Total value: Not possible (since A and B have a total value of 3, and E and F must be equal to 5)
Solution 5:
A + C = ?
B + D = ?
E + F = ?
Since A and E have a total value of 6 (1 + 5), we can substitute their values in the equations:
(? + ?) = 11
(? + 4) = ?
Now, let's try different combinations using these equations.
Solution 5:
A + C = 3
B + D = 8
Total value: Not possible (since A and B have a total value of 3, and E and F must be equal to 5)
As we can see, none of the new solutions match the required total value of 16.
Let's try again with a different approach.
Disclaimer:
1. This content is compiled from the internet and represents only the author's views, not the site's stance.
2. The information does not constitute investment advice; investors should make independent decisions and bear risks themselves.
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