Sort a list of numbers into \"prime\" or \"composite\".
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\n| Number | \nPrime/Composite | \nFactors | \n
| $\\var{b}$ | \nPrime | \n$1$, $\\var{b}$ | \n
| $\\var{k}$ | \nPrime | \n$1$, $\\var{k}$ | \n
| $\\var{f}$ | \nComposite | \n$1$, $2$, $\\var{f/2}$, $\\var{f}$ | \n
| $\\var{a}$ | \nPrime | \n$1$, $\\var{a}$ | \n
| $\\var{d}$ | \nComposite | \n$1$, $\\var{sqrtd}$, $\\var{d}$ | \n
| $\\var{h}$ | \nComposite | \n$\\var{latex(hlist)}$ | \n
| $\\var{j}$ | \nPrime | \n$1$, $\\var{j}$ | \n
Identify which of the following are prime numbers.
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\nA number that can be divided without remainder by numbers other than itself and 1 is known as a composite number.
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", "Composite
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", "$\\displaystyle\\var{k}$
", "$\\displaystyle\\var{f}$
", "$\\displaystyle\\var{a}$
", "$\\displaystyle\\var{d}$
", "$\\displaystyle\\var{h}$
", "$\\displaystyle\\var{j}$
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