SOLUTION: ∫a^2 dx (given log 10^2 = 0.3010)

Algebra.Com
Question 458356: ∫a^2 dx
(given log 10^2 = 0.3010)
Found 2 solutions by Alan3354, richard1234:
Answer by Alan3354(69443)   (Show Source): You can put this solution on YOUR website!
log(2) = 0.3010 ??
Is a a constant?
-----------
∫a^2 dx = x*a^2 + C
I don't see the relevance of log(2), and you don't need to tell us what log(2) is.
Answer by richard1234(7193)   (Show Source): You can put this solution on YOUR website!


Logarithms not needed for this one.
RELATED QUESTIONS

given log 7=0.8451 and log 2 =0.3010, find the value of log 28. (answered by Alan3354,Theo,ikleyn,MathTherapy)
Given Log 2=.3010 and log 3 =.4771, find: a. log (240) b. log... (answered by jsmallt9)
Given that log(2) ≈ 0.3010, find the value of the logarithm.... (answered by ikleyn)
11) Given log a = 0.3010 and log b = 0.4771, evaluate log 24... (answered by josgarithmetic,greenestamps)
given that log2 = 0.3010, log3= 0.4771 and log7= 0.8451 evaluate 1.log(14/3) 2.log (answered by Alan3354)
∫(3x^2-2)(x^3-2x)^5... (answered by ewatrrr)
Integrate the following function:... (answered by jim_thompson5910)
∫▒(7x+8)/(2x^2+11x+5) dx (answered by Boreal)
∫▒(7x+8)/(2x^2+11x+5) dx (answered by Alan3354)