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series -12288,3072,-768,x,-48 find x
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Sure looks like we are dividing a term by -4 to get to the next one,
so .....
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2. find the next three terms of the sequence.
-6, -24, -96, -384 1) -768, -1536 , -3072 2) -768, -3072, -12288 3) -1536, -6144 ,
Top answer:
It's mulitplying by 4 everytime -6 * 4 = -24 -24 * 4 = -96 -96 * 4 = -384 -384 * 4 = -1536 -1526 * 4
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what are the next 3 terms?
12288, 3072 768 192
Top answer:
Each number is 4 times the next number. Divide 192 by 4.
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What are the next three terms in the sequence 12288, 3072, 768, 192?
Top answer:
3072 / 12288 = 0.25 768 / 3072 = 0.25 192 / 768 = 0.25 This is Geometric progression wit common
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Represent the function f(x)=10ln(8-x) as a Maclaurin series.
sum_{n=0}^infty (c_n) (x^n) The coefficients are C_0= 10ln8
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To find the Maclaurin series representation of the function f(x) = 10ln(8-x), we need to compute the
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Represent the function f(x)=10ln(8-x) as a Maclaurin series.
sum_{n=0}^infty (c_n) (x^n) The coefficients are C_0= 10ln8
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To find the radius of convergence for a Maclaurin series, we can use the ratio test. The ratio test
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I need a fraction example using 1024 x 768. It is for building a web page. So I guess the fractions would be 1024/1 x 768/1 .Any
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http://en.wikipedia.org/wiki/Display_resolution
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Find four geometric means between 4096 and 972.
an=a1*r^n-1 a6=972*r^6-1 4096=972r^5 4.2=r^5 1.3 972(1.3)=1296 1296(1.3)=1728
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in your sequence term<sub>1</sub> = 4096 so a=4096 and term<sub>6</sub> = ar^5 = 972 then r^5 =
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Find the next three terms of the sequence -6, -24, -96, -184
A. -768, -1,536, -3,072 B. -768, -3,072, -12,288 C. -1,536, -6,144,
Top answer:
I think you have a typo if the sequence had been : -6, -24, -96, -384 each new term would be 4 times
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Find the next three terms of the sequence: -6, -24, -96, -384,...
A. -768, -1,536, -3,072 B. -768, -3,072, -12,288 C. -1,536,
Write an exponential function in the form y, equals, a, b, to the power x y=ab
x that goes through the points left bracket, 0,
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To find the exponential function that goes through the points (0, 6) and (3, 3072), we can use the
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1.) Find an exponential function of the form y=ab^x whose graph passes through the points (2,48) and (5,3072)
2.) The variables x