159 results for "choice".
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Question in Chris's workspace
Small demo using the JME implementation of JSXGraph inline in a multiple choice question.
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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 $x$: $\displaystyle 2\log_{a}(x+b)- \log_{a}(x+c)=d$.
Make sure that your choice is a solution by substituting back into the equation.
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Question in Bill's workspace
Find $\displaystyle \int \frac{2ax + b}{ax ^ 2 + bx + c}\;dx$
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Question in Matt's workspace
Two multiple choice questions for Tearoom Trade
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Question in How-tos
No description given
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Question in Demos
No description given
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Question in DemosThis question demonstrates how to use explore mode to simulate a game, where each choice made by the student changes the state of the game.
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Question in How-tos
This question contains a "choose several answers" part which has an "all-or-nothing" mark scheme: the student is only awarded marks if they tick all of the correct choices, and no incorrect choices.
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Question in NC Math 3
Multiple choice question. Given a randomised polynomial select the possible ways of writing the domain of the function.
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Question in MY QUESTIONS
Multiple choice question. Given a randomised polynomial select the possibe ways of writing the domain of the function.
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Question in How-tos
A "match choices with answers" part where the student either gets all the marks or none. Any incorrect choice is penalised with a huge negative mark, so they end up with the minimum mark of 0.
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Question in How-tosThis question shows how to make the correct answer to a "choose one from a list" part depend on randomised question variables, in a couple of ways. The first part uses JME expressions to define the marks available for each choice. The second part uses the "custom marking matrix" option.
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Question in Content created by Newcastle University
Given descriptions of 3 random variables, decide whether or not each is from a Poisson or Binomial distribution.
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Question in Content created by Newcastle University
Given $\frac{a}{b} \in \mathbb{Q}$ for suitable choices of $a$ and $b$, find all $n \in \mathbb{N}$ such that $\phi(n)=\frac{a}{b}n$.
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Question in Content created by Newcastle University
Multiple response question (4 correct out of 8) covering properties of convergent and divergent sequences and boundedness of sets. Selection of questions from a pool.
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Question in Content created by Newcastle University
Determine if the following describes a probability mass function.
$P(X=x) = \frac{ax+b}{c},\;\;x \in S=\{n_1,\;n_2,\;n_3,\;n_4\}\subset \mathbb{R}$.
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Question in Content created by Newcastle University
No description given
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Question in Content created by Newcastle University
Two shops each have different numbers of jumper designs and colours. How many choices of jumper are there?
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Question in Content created by Newcastle University
Multiple response question (2 correct out of 4) covering properties of continuity and differentiability. Selection of questions from a pool.
Can choose true and false for each option. Also in one test run the second choice was incorrectly entered, rest correct, but the feedback indicates that the third was wrong.
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Question in Content created by Newcastle University
Solve for $x(t)$, $\displaystyle\frac{dx}{dt}=\frac{a}{(x+b)^n},\;x(0)=0$
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Question in Content created by Newcastle University
What is the value of the expression given a choice of n?
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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 Content created by Newcastle University
Given descriptions of 3 random variables, decide whether or not each is from a Poisson or Binomial distribution.
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Exam (11 questions) in Computational ProbabilityThis assignment tests your comprehension of the material presented in lectures ( and labs ) up to and including the lecture on Thursday 7th November. Please answer the questions without the aid of a computer ( calculators are allowable ) as you won't have access to one in the January examination. The questions require the calculation of either a specific number, making a true/false choice, or matching code to mathematics. The numeric data within a question will have been randomised ( generated form a highly specified template ).
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Question in All questionsMulti choice question week 3
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Question in Lovkush's workspace
multiple choice question on this week's content
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Question in Lovkush's workspace
Template question. Multiple choice.
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Question in Leonardo's workspace
multiple choice testing sin, cos, tan of random(0,90,120,135,150,180,210,225,240,270,300,315,330) degrees
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Question in All questions
Template question. Seven statements given and student should determine if they are true or false. It is possible that 1,2,3,4,5 or 6 out of the 7 statements will be true and these are all equally likely.