235 results for "logarithm".
-
Question in MASH Bath: Question Bank
Finding $x$ from a logarithmic equation of the form $\log_x \left(\frac{1}{\sqrt(a)}\right) = \frac{1}{2}$, for a positive integer $a$.
-
Question in MASH Bath: Question Bank
Finding $x$ from a logarithmic equation of the form $\log_ax = b$, where $a$ is a positive integer and $b$ is a positive fraction.
-
Question in MASH Bath: Question Bank
Finding $x$ from a logarithmic equation of the form $\log_ax = b$, where $a$ and $b$ are positive integers.
-
Question in MASH Bath: Question Bank
Finding $x$ from a logarithmic equation of the form $\log_xa = b$, where $a$ and $b$ are positive integers.
-
Question in MASH Bath: Question Bank
Solving $e^{\ln(x)}+\ln(e^x)=a$ for $x$.
-
Question in MASH Bath: Question Bank
Solving an equation of the form $a^x=b$ using logarithms to find $x$.
-
Exam (2 questions) in MASH Bath: Moodle quizzes and TS
No description given
-
Question in Ugur's workspace
Given a sum of logs, all numbers are integers,
$\log_b(a_1)+\alpha\log_b(a_2)+\beta\log_b(a_3)$ write as $\log_b(a)$ for some fraction $a$.
Also calculate to 3 decimal places $\log_b(a)$.
-
Question in Ugur's workspace
Rearrange some expressions involving logarithms by applying the relation $\log_b(a) = c \iff a = b^c$.
-
Question in Ugur's workspace
Practice using the log rules to add and subtract logarithms
-
Question in 0 Calculo derivadas
Differentiating the natural logarithm
-
Question in DIAGNOSYS
No description given
-
Question in How-tos
Shows how to enter a logarithm to an arbitrary base, in a mathematical expression part.
-
Question in Trash-backup
Express $\log_a(x^{c}y^{d})$ in terms of $\log_a(x)$ and $\log_a(y)$.
-
Question in Ida's workspace
Rearrange some expressions involving logarithms by applying the relation $\log_b(a) = c \iff a = b^c$.
-
Question in MATH6006 - Engineering Maths 102
Logarithmic differentiation question with customised feedback to catch some common errors.
-
Question in MATH6006 - Engineering Maths 102
Logarithmic differentiation question with customised feedback to catch some common errors.
-
Question in Core Foundation Maths
No description given
-
Question in Ida's workspace
Use laws for addition and subtraction of logarithms to simplify a given logarithmic expression to an arbitrary base.
-
Question in Joël's workspace
Use laws for addition and subtraction of logarithms to simplify a given logarithmic expression to an arbitrary base.
-
Question in Blathnaid's workspace
Use laws for addition and subtraction of logarithms to simplify a given logarithmic expression to an arbitrary base.
-
Question in Logs and exponentials
Practice using the log rules to add and subtract logarithms
-
Question in Introduction to Calculus
Solve for $x$: $\log_{a}(x+b)- \log_{a}(x+c)=d$
-
Question in Introduction to Calculus
Given $\rho(t)=\rho_0e^{kt}$, and values for $\rho(t)$ for $t=t_1$ and a value for $\rho_0$, find $k$. (Two examples).
-
Question in Bill's workspace
Given $\rho(t)=\rho_0e^{kt}$, and values for $\rho(t)$ for $t=t_1$ and a value for $\rho_0$, find $k$. (Two examples).
-
Question in Introduction to Calculus
Apply and combine logarithm laws in a given equation to find the value of $x$.
-
Question in Introduction to Calculus
Solve for $x$ each of the following equations: $n^{ax+b}=m^{cx}$ and $p^{rx^2}=q^{sx}$.
-
Question in Introduction to Calculus
Solve for $x$: $\log(ax+b)-\log(cx+d)=s$
-
Question in Introduction to Calculus
Solve for $x$: $\displaystyle 2\log_{a}(x+b)- \log_{a}(x+c)=d$.
Make sure that your choice is a solution by substituting back into the equation.
-
Question in Introduction to Calculus
Express $\log_a(x^{c}y^{d})$ in terms of $\log_a(x)$ and $\log_a(y)$. Find $q(x)$ such that $\frac{f}{g}\log_a(x)+\log_a(rx+s)-\log_a(x^{1/t})=\log_a(q(x))$