Question 911855
Determine if the following conjecture is true. If not, give a counterexample. 

The cubic power of an odd integer is odd.

Options: 

true
	false; 73 = 342
73 <> 342
	false; 93 = 728
93 <> 728
OR
	false; 53 = 126
53 <> 126
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Do you mean to enter exponents?
Use ^ (Shift 6) for exponents.
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7^3 still not equal to 342, it's 343
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An odd integer to any integral power is and odd number.
(2n+1)^x = an odd number (n & x are integers)