IF T = 1 / (2^9 * 5^3) IS EXPRESSED AS A TERMINATING DECIMAL, HOW MANY ZEROS WILL (T) HAVE BETWEEN THE DECIMAL POINT AND THE FIRST NONZERO DIGIT TO THE RIGHT OF THE DECIMAL POINT?
A - THREE
B - FOUR
C - FIVE
D - SIX
E - NINE
OG ANSWER IS B... I SOLVED THE QUESTION GOING THROUGH THE MATH THE LONG WAY ...
2 ^ 9 = 512
5 ^ 3 = 125
-----
64,000
1/64000 = .00001 ---> # OF 0'S BEFORE A NON-ZERO DIGIT = 4
CAN SOMEONE SHOW ME HOW TO SOLVE THIS AN EASIER WAY? THANKS!
IF T = 1 / (2^9 * 5^3) IS EXPRESSED
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- smackmartine
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IMO B
T = 1 / (2^9 * 5^3)
Notice that 2*5 = 10 , so let's try to leverage this fact.
T = 1/ (2)^6 (2*5)^3 = (1/2)^6* 1/(10)^3
Also, 1/2 = 0.5 or 5/10 so, let's re write the expression in terms of powers of 10.
T = (5)^6 * 1/(10)^(6+3) = (5)^6 /(10)^9
At this point you should remember that (5)^4 = 625 [since 25*25 = 625]
which gives 25* 625 = 15625 [relatively easier to calculate]
So , T = 0.000015625 ,so # of ZEROS WILL (T) HAVE BETWEEN THE DECIMAL POINT AND THE FIRST NONZERO DIGIT TO THE RIGHT OF THE DECIMAL POINT = 4
Take away: try to look for simple relation between the digits that can cut short long calculations.
T = 1 / (2^9 * 5^3)
Notice that 2*5 = 10 , so let's try to leverage this fact.
T = 1/ (2)^6 (2*5)^3 = (1/2)^6* 1/(10)^3
Also, 1/2 = 0.5 or 5/10 so, let's re write the expression in terms of powers of 10.
T = (5)^6 * 1/(10)^(6+3) = (5)^6 /(10)^9
At this point you should remember that (5)^4 = 625 [since 25*25 = 625]
which gives 25* 625 = 15625 [relatively easier to calculate]
So , T = 0.000015625 ,so # of ZEROS WILL (T) HAVE BETWEEN THE DECIMAL POINT AND THE FIRST NONZERO DIGIT TO THE RIGHT OF THE DECIMAL POINT = 4
Take away: try to look for simple relation between the digits that can cut short long calculations.
Last edited by smackmartine on Sat Nov 12, 2011 6:28 pm, edited 1 time in total.
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Hey 'smackmartine'; I agree with your answer choice, however not sure how you got the above step,T = 1/ (2)^5 (2*5)^3 = (1/2)^5* 1/(10)^3
IMO T = 1/ (2)^6 (2*5)^3 = (1/2)^6* 1/(10)^3
however the answer will be the same 'B'.
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1/(2^9 * 5^3) = 1/(10^3 * 2^6) = 1/1000 * 1/64
1/1000 - 3 0's
Now any number 'x' 10>x>100 in the denominator will have one '0', so 1/64 will have 1 '0'. Total = 4
1/1000 - 3 0's
Now any number 'x' 10>x>100 in the denominator will have one '0', so 1/64 will have 1 '0'. Total = 4
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Edited..Thanks for the catch :)Neo Anderson wrote:Hey 'smackmartine'; I agree with your answer choice, however not sure how you got the above step,T = 1/ (2)^5 (2*5)^3 = (1/2)^5* 1/(10)^3
IMO T = 1/ (2)^6 (2*5)^3 = (1/2)^6* 1/(10)^3
however the answer will be the same 'B'.
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The number of 0's depends on how many powers of 10 are in the denominator.factor26 wrote:IF T = 1 / (2^9 * 5^3) IS EXPRESSED AS A TERMINATING DECIMAL, HOW MANY ZEROS WILL (T) HAVE BETWEEN THE DECIMAL POINT AND THE FIRST NONZERO DIGIT TO THE RIGHT OF THE DECIMAL POINT?
A - THREE
B - FOUR
C - FIVE
D - SIX
E - NINE
OG ANSWER IS B... I SOLVED THE QUESTION GOING THROUGH THE MATH THE LONG WAY ...
2 ^ 9 = 512
5 ^ 3 = 125
-----
64,000
1/64000 = .00001 ---> # OF 0'S BEFORE A NON-ZERO DIGIT = 4
CAN SOMEONE SHOW ME HOW TO SOLVE THIS AN EASIER WAY? THANKS!
1/(2�*5³) = 1/(2�)(2³*5³) = 1/(64*10³) = 1/64,000.
1/10,000 = .0001.
1/100,000 = .00001.
Since the denominator (64,000) is between 10,000 and 100,000, four 0's will appear to the right of the decimal point.
The correct answer is B.
Only when the denominator reaches 1,000,000 will a fifth 0 be needed:
1/1,000,000 = .000001.
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Solution:factor26 wrote:IF T = 1 / (2^9 * 5^3) IS EXPRESSED AS A TERMINATING DECIMAL, HOW MANY ZEROS WILL (T) HAVE BETWEEN THE DECIMAL POINT AND THE FIRST NONZERO DIGIT TO THE RIGHT OF THE DECIMAL POINT?
A - THREE
B - FOUR
C - FIVE
D - SIX
E - NINE
OG ANSWER IS B... I SOLVED THE QUESTION GOING THROUGH THE MATH THE LONG WAY ...
2 ^ 9 = 512
5 ^ 3 = 125
-----
64,000
1/64000 = .00001 ---> # OF 0'S BEFORE A NON-ZERO DIGIT = 4
CAN SOMEONE SHOW ME HOW TO SOLVE THIS AN EASIER WAY? THANKS!
We use the term "leading zeroes" to describe the zeroes between the decimal point and the first nonzero decimal digit lying to the right of the decimal point. We can use the following rule to determine the number of leading zeroes in a fraction when it is converted to a decimal:
If X is an integer with k digits, then 1/X will have k - 1 leading zeroes unless X is a perfect power of 10, in which case there will be k - 2 leading zeroes.
We see that t is in the form 1/X. Because the denominator X has more twos than fives, we know X is not a perfect power of 10. Before considering the fraction as a whole, we first must determine the number of digits in the denominator.
Rewriting the denominator, we get 2^9 x 5^3 = (2^6 x 2^3) x 5^3 = 2^6 x (2^3 x 5^3) = 2^6 x 10^3 = 64 x (1,000) = 64,000, which is a 5-digit integer. Thus, k = 5.
Using our rule, we see that the fraction t has 5 - 1 = 4 leading zeroes.
Answer: B
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1/64000
can be simplified as 1/64 * .00015
1/64 equals 0.01
so 0.01 *0.00015 = 0.000015
so 4 zeros
can be simplified as 1/64 * .00015
1/64 equals 0.01
so 0.01 *0.00015 = 0.000015
so 4 zeros