Where are the numbers or just this? We need numbers like 1 0 6
12
1. Buddy Frosty
2. Buddy Flake
3. Buddy Freeze
4. Cubby Frosty
5. Cubby Flake
6. Cubby Freeze
7. Snowball Frosty
8. Snowball Flake
9. Snowball Freeze
10. Alabaster Frosty
11. Alabaster Flake
12. Alabaster Freeze
Answer:
Yes, the sum of any two lengths is greater than the third length
Step-by-step explanation:
we know that
The <u><em>Triangle Inequality Theorem</em></u> states that the sum of any 2 sides of a triangle must be greater than the measure of the third side
In this problem
Applying the Triangle Inequality Theorem
1) 9+5 > 8 ----> is ok
2) 8+5 > 9 ---> is ok
3) 8+9 > 5 ---> is ok
therefore
Yes, the sum of any two lengths is greater than the third length
Answer:
C
6 and 7
Step-by-step explanation:
6) x^5y^7 / x^2y^3
= x^(5-2) * y^(7-3)
= x^3y^4
7) ![\sqrt[3]{300}](https://tex.z-dn.net/?f=%5Csqrt%5B3%5D%7B300%7D)
= 6.69432..
OR you can try 6^3 and 7^3 values
216 343
as 300 is between 216 and 343
so \sqrt[3]{300} is between 6 and 7
so it is between 6 and 7
