Yes, for all the values between 0 and 1, all the numbers are negatives
Logarithmic equation
A basic logarithmic equation would be of the form y = a + b*ln(x)
y = b^x
If the equation was ln(x) = 2.35 then x = 10.4856, approx.
I don't see an equation. An equation must have an equal sign. For a question in answers.com, you'll have to write the word "equals", since symbols get lost.
A logarithmic equation would be any equation that includes the log function.
The given equation is exponential, not logarithmic!The logarithmic equation equivalent to ea= 47.38 isa = ln(47.38)ora = log(47.38)/log(e)The given equation is exponential, not logarithmic!The logarithmic equation equivalent to ea= 47.38 isa = ln(47.38)ora = log(47.38)/log(e)The given equation is exponential, not logarithmic!The logarithmic equation equivalent to ea= 47.38 isa = ln(47.38)ora = log(47.38)/log(e)The given equation is exponential, not logarithmic!The logarithmic equation equivalent to ea= 47.38 isa = ln(47.38)ora = log(47.38)/log(e)
Logarithmic equation
A basic logarithmic equation would be of the form y = a + b*ln(x)
10a = 478
dB is a logarithmic scale, so the answer, basically, is negative infinity.dB is a logarithmic scale, so the answer, basically, is negative infinity.dB is a logarithmic scale, so the answer, basically, is negative infinity.dB is a logarithmic scale, so the answer, basically, is negative infinity.
ln 60 = a
In a mathematical equation, the constant is defined as a term in the equation that only includes a real number. Since a negative number is a real number, then yes, a negative number can be considered a constant. For example, in the equation 6x -2... -2 would be the constant because it is a term that contains only the real number (-2).
A negative number in the net force equation indicates that the forces acting on an object are in opposite directions.
If by "real life" you include the physical world, then you express the spontaneous decay of radioactivity in a sample with a logarithmic equation.
if y = x^a, then logxy = a
y = b^x