236 results for "logarithm".
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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 $\frac{f}{g}\log_a(x)+\log_a(rx+s)-\log_a(x^{1/t})=\log_a(q(x))$
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Question in Introduction to Calculus
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 $\log_b(a)$.
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Question in Introduction to Calculus
Use the rule $\log_a(n^b) = b\log_a(n)$ to rearrange some expressions.
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Question in Introduction to Calculus
Rearrange some expressions involving logarithms by applying the relation $\log_b(a) = c \iff a = b^c$.
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Question in Introduction to Calculus
Solve for $x$: $c(a^2)^x + d(a)^{x+1}=b$ (there is only one solution for this example).
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Exam (11 questions) in Jill's workspace
This quiz contains questions on algebraic fractions, logarithmic equations, exponential equations, quadratic equations and simultaneous equations.
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Question in Bill'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 $\log_b(a)$.
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Question in Bill's workspace
Solve for $x$: $c(a^2)^x + d(a)^{x+1}=b$ (there is only one solution for this example).
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Question in Bill's workspace
Solve for $x$ each of the following equations: $n^{ax+b}=m^{cx}$ and $p^{rx^2}=q^{sx}$.
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Question in Bill's workspace
Solve for $x$: $\log_{a}(x+b)- \log_{a}(x+c)=d$
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Question in Bill's workspace
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.
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Question in Bill's workspace
Solve for $x$: $\log(ax+b)-\log(cx+d)=s$
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Question in Bill's workspace
Express $\log_a(x^{c}y^{d})$ in terms of $\log_a(x)$ and $\log_a(y)$. Find $q(x)$ such that $\frac{f}{g}\log_a(x)+\log_a(rx+s)-\log_a(x^{1/t})=\log_a(q(x))$.
There is a video included explaining the rules of logarithms by going through simplification of logs of numbers rather than algebraic expressions.
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Question in Content created by Newcastle University
Find $\displaystyle I=\int \frac{2 a x + b} {a x ^ 2 + b x + c}\;dx$ by substitution or otherwise.
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Exam (4 questions) in Kariane's workspaceLog expressions and equations
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Exam (2 questions) in Suzy's workspace
No description given
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Question in Content created by Newcastle University
Express $\log_a(x^{c}y^{d})$ in terms of $\log_a(x)$ and $\log_a(y)$. Find $q(x)$ such that $\frac{f}{g}\log_a(x)+\log_a(rx+s)-\log_a(x^{1/t})=\log_a(q(x))$
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Question in Content created by Newcastle University
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.
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Question in Transition to university
Rearrange some expressions involving logarithms by applying the relation $\log_b(a) = c \iff a = b^c$.
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Exam (4 questions) in Transition to university
Questions on manipulating logarithms.
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Question in Transition to university
Use the rule $\log_a(n^b) = b\log_a(n)$ to rearrange some expressions.
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Question in Transition to university
Use laws for addition and subtraction of logarithms to simplify a given logarithmic expression to an arbitrary base.
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Question in Transition to university
Apply and combine logarithm laws in a given equation to find the value of $x$.
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Exam (40 questions) in NC Math 3Students will assess their ability to solve problems involving logs and exponentials.
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Question in NC Math 3
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Question in NC Math 3
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Question in NC Math 3
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Exam (40 questions) in NC Math 3Students will review and practice problems involving logs and exponentials.
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Exam (16 questions) in NC Math 3Students will find the inverse of log and exponential functions.
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Question in NC Math 3
No description given