Given that n is an even Integer, chaz conjectured that n is divisible by 4 which number is a counter example to Chaz’s conjectur
e
2 answers:
By definition, a number is divisible by 4 if the last two digits of the number are divisible by 4.
A number can be even while not being divisible by 4.
For example, the number 218 is even, but is not divisible by 4 since 18 is not divisible by 4.
Hope this helps.
頑張って!
Answer:
Step-by-step explanation:
2 and 6 are the first 2 counterexamples. Any number that has only 1 two as its prime factors cannot be divisible by 4.
2 * 5 * 7 = 70 which is not divisible by 4.
If the number has more than one 2 as a prime factor, it is divisible by 4.
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Answer:
= -7
Step-by-step explanation:
6 ⁹ ×6^x = 6²
From the laws of indices;
aⁿ × aⁿ = a^2n
Therefore;
6 ⁹ ×6^x = 6^(9+x)
6^(9+x) = 6²,
Since the bases are the same then the exponents are equal;
9+x = 2
x = -7
Answer: -3x⁵y²
its simplified :)
The range is all Y VALUES, and the graph goes from -1 to 5, so the answer is -1≤x≤5, which I believe is C.
<h2>
-1≤x≤5 (C)</h2>
30
factors of 6: 6 12 18 24 30
factors of 5: 5 10 15 20 25 30
so its 30
or simply multiple the denominators 6×5=30
Hi!
<u>For your first question:</u>
When it looks like this, with an exponent, then parentheses, then an exponent, we should multiply the exponents.
^10
<em>P.S. As for your second question, I believe I already answered that on your other question!</em>
