SOLUTION: Which term in the expansion of ((1/2x^3) - x^5))^8 is a constant?
I know you put it into the equation t (k+1) = (nCk) a^(n-k) b^k to get:
= 8Ck (1/(2x^3))^(8-k) (-x^5)^k
B
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-> SOLUTION: Which term in the expansion of ((1/2x^3) - x^5))^8 is a constant?
I know you put it into the equation t (k+1) = (nCk) a^(n-k) b^k to get:
= 8Ck (1/(2x^3))^(8-k) (-x^5)^k
B
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Question 927305: Which term in the expansion of ((1/2x^3) - x^5))^8 is a constant?
I know you put it into the equation t (k+1) = (nCk) a^(n-k) b^k to get:
= 8Ck (1/(2x^3))^(8-k) (-x^5)^k
But I don't know what to do after.
Thank you for the help!
Write with a negative exponent,
Multiply exponents and write as
Multiply exponents again and write as
Write as and then as
Next add the exponents of x: and get
Now remember what I said in the beginning.
To becom a constant the variable x must be raised to the 0 power:
So we set the exponent of x equal to 0
So we substitute 3 for x:
For your information so as to see what the entire expansion
looks like when simplified:
So the constant term is really the 4th term, when k=3.
Edwin
