$100,000 invested at 12% compounded monthly for 5 years. A=1000,000(1.01)^60. Given log 1.01=.00432. Find log A.
Please show the steps. Im 48 years old, in college algebra, and confused...Help!-There
-Ten minutes after Sashas little brother left home for karate class Sasha saw that he had forgotten his karate uniform and she ran after him. If Sasha runs twice as fast as her little brother how long
im not sure how to do this ? im pretty sure is trig substitution ?
steps would be appriciated !!
thanks in advance :D-sqrt(a^2-x^2) = (a)sqrt(1-(x/a)^2)
Let x/a = sin(u)
dx = (a)cos(u)du
1 - sin^
P(x) = x^4+6*x^3-13*x^2-66*x+72 ; By trial find out for what value of x, P(x) = 0P(1) = 0==> P(x) = 0 has a root x = 1 ==> x - 1 is a factor of P(x)Now P(x) = x^4 - x^3 + 7x^3 - 7x^2 - 6x^2 + 6x - 72x
I think its quite weird, but I dont know. Is it just me? I think it may be my teacher, she makes it seem extremely hard, but when I do regular Algebra in my extra class, its so fun for me, and I reall
Consider the Maclaurins series of (1+x)
(a) are there finitely many or infinitely many terms in this Maclaurins series? Justify your answer..
(b) Write down all of the terms if there are finitely many
homework help:)
please.
f(x)= abs(x-2), find all values of x such that f(x) > 1-Given: |x - 2| > 1
Case 1: x - 2 > 1
x > 3
Case 2: -(x - 2) > 1
-x + 2 > 1
-x > -1
x
Therefore, (-inf, 1) U (3,
i dont know how to type this problem out but here goes, its part of a system of three equations:
i just need to know how to remove fractions
[(x+2)/6]-[(y+4)/3]+z/2=0
[(x+1)/2)]+[(y-1)/2]-z/4=9/2
[
So it says I have to make an equation and solve it.
How do I do that??? Please list steps if you can?
Thanks In Advance!-Convert everything to decimals:
2.5n = 1.2
Divide both sides by 2.5:
n = 1
The number of bacteria present after t minutes is given as B=1000e^kt. Amount of bacteria is 9539 after 4 minutes. Find k.
Please show steps. Oh my goodness. Help?-just take natural logs ! no need to
First, get the value in front of x² by itself by dividing everything by the coefficient before it, yielding:
x² - 2x = 3/2
Now you have to add the value of (b/2)² to both sides, where b is the value
128sin^8θ-Best way to deal with the expansion is
De Moivres Theorem
(Cosx + isinx)^n= cosnx + isinnx
Now expand the left hand side using binomial theorem (set n = 8) and ten compare real and imagi
if f : R2 -> R is differentiable and F(u,v) = f(u+v, u-v), show that (these are the curly ds) (dF/du)(dF/dv) = (df/dx)^2 - (df/dy)^2, where the functions on the right-hand side are evaluated at .
Thi
I have no idea how to go about answering this question, can somebody help please...
Consider the vector equation x=p+t(q-p), where p and q correspond to distinct points P and Q in R2 or R3.
(a) Show
