Ask a New Question

Question

equation log_b a = c.
a) If 0 < a < 1 < b, what can you conclude about c?

b) If a < 0 < 1 < b, what can you conclude about c?

Please help !
9 years ago

Answers

Damon
I guess you mean log base b of a = c

log a = c

b^(log a) = a = b^c

if a<1 and b >1
then
fraction = big number^c
hmm
it would be helpful if c <0
like
fraction = b^c = 5^-2 = 1/25

if a<0 and b >1
then
logb (-something)
oh my, we are trying to take the log of a negative number. Try that on your calculator
9 years ago

Related Questions

Show that if log_b (a) = c, and log_y (b) = c, then log_a (y)=c^-2 solve equation if equation has no solution state so,simply when necessary 2/3x+1x=1/6 1/x+4-1/... if log_a 3 = log_b 27 then show that b=a^3 log_a mean log base a. given log_b a = c, which statement is true? (the b is subscript) a. a = b^c b. c = a^b c. c = b... A blank equation is an equation with an infinity number of solutions True False Identity Which of the following equations has a different value of x than the others?(1 point) a. x + 9/8... Which of the following equations has a solution of -11/4? A. -1/2×=11/2 B. -2×=11/2 C. -2×=2/11... Using the properties log_b (1/m) = -log_b (m) and log_b(m/n) = log_b (m) - log_b(n), how can In11 -... Use the rule log_b (xy) = log_b x+ log_b to find log (16 • 64). (1 point) •10 •16 •4 •3 Explain the equation equation: Work = force x distance
Ask a New Question
Archives Contact Us Privacy Policy Terms of Use