based on the tables and coordinante plane identify the missing equivlent ratios from the coordinante plane
the tables show 5 to 4 10 to 8 15 to 12 20 to 16 25 to 20 6 to 5 12 to 10 18 to 15 24 to 20
Based on the given ratios from the tables and coordinate plane, the missing equivalent ratios can be determined as follows:
1) The first ratio is 5 to 4. The equivalent ratio can be determined by performing the same operation on both the numerator and the denominator. In this case, multiplying both by 2 gives an equivalent ratio of 10 to 8.
2) The second ratio is 10 to 8. Similarly, multiplying both the numerator and the denominator by 2 gives an equivalent ratio of 20 to 16.
3) The third ratio is 15 to 12. Again, multiplying both by 2 gives an equivalent ratio of 30 to 24.
4) The fourth ratio is 20 to 16. By multiplying both by 2, an equivalent ratio of 40 to 32 is obtained.
5) The fifth ratio is 25 to 20. Multiplying both by 2 gives an equivalent ratio of 50 to 40.
6) The sixth ratio is 6 to 5. Multiplying both by 2 gives an equivalent ratio of 12 to 10.
7) The seventh ratio is 12 to 10. This ratio is already in simplified form and does not have any missing equivalent ratios.
8) The eighth ratio is 18 to 15. By multiplying both by 2, an equivalent ratio of 36 to 30 is obtained.
9) The ninth ratio is 24 to 20. Again, multiplying both by 2 gives an equivalent ratio of 48 to 40.
Therefore, the missing equivalent ratios from the coordinate plane are 30 to 24, 40 to 32, 50 to 40, 36 to 30, and 48 to 40.
wrong
I apologize for the incorrect response. Let's identify the missing equivalent ratios accurately.
Based on the given ratios from the tables and coordinate plane, the missing equivalent ratios can be determined as follows:
1) The first ratio is 5 to 4. The equivalent ratios can be found by multiplying both the numerator and denominator by the same number. For example, multiplying both by 2 gives an equivalent ratio of 10 to 8.
2) The second ratio is 10 to 8. Similarly, multiplying both by 2 gives an equivalent ratio of 20 to 16.
3) The third ratio is 15 to 12. Multiplying both by 2 gives an equivalent ratio of 30 to 24.
4) The fourth ratio is 20 to 16. By multiplying both by 2, an equivalent ratio of 40 to 32 is obtained.
5) The fifth ratio is 25 to 20. Multiplying both by 2 gives an equivalent ratio of 50 to 40.
6) The sixth ratio is 6 to 5. This ratio is already in simplified form and does not have any missing equivalent ratios.
7) The seventh ratio is 12 to 10. Similarly, this ratio is already in simplified form and does not have any missing equivalent ratios.
8) The eighth ratio is 18 to 15. We can simplify this ratio by dividing both the numerator and denominator by their greatest common divisor. The greatest common divisor of 18 and 15 is 3. Dividing both by 3 gives an equivalent ratio of 6 to 5.
9) The ninth ratio is 24 to 20. Similarly, we can simplify this ratio by dividing both the numerator and denominator by their greatest common divisor. The greatest common divisor of 24 and 20 is 4. Dividing both by 4 gives an equivalent ratio of 6 to 5.
Therefore, the missing equivalent ratios from the coordinate plane are 10 to 8, 20 to 16, 30 to 24, 50 to 40, 6 to 5, and 6 to 5.
so what is the answer
Based on the given ratios from the tables and coordinate plane, the missing equivalent ratios are:
1) 5 to 4 is equivalent to 10 to 8.
2) 15 to 12 is equivalent to 30 to 24.
3) 20 to 16 is equivalent to 40 to 32.
4) 25 to 20 is equivalent to 50 to 40.
5) 18 to 15 is equivalent to 6 to 5.
6) 24 to 20 is equivalent to 6 to 5.
Which one is correct i can only choose one
those are all wrong the answer is 25,20 24,20
Apologies for the confusion in my previous responses. The correct missing equivalent ratios from the given tables and coordinate plane are:
1) 5 to 4 is equivalent to 10 to 8.
2) 15 to 12 is equivalent to 30 to 24.
3) 20 to 16 is equivalent to 40 to 32.
4) 25 to 20 is equivalent to 5 to 4.
5) 18 to 15 is equivalent to 6 to 5.