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(k)/(4)+3=14
What is the value of
k in the equation shown?

◻

$\frac{k}{4}+3=14$ $\newline$ What is the value of $k$ in the equation shown? $\newline$ $\square$

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Find limits involving trigonometric functions

Full solution

Q.

\frac{k}{4}+3=14

\newline

What is the value of

k

in the equation shown?

\newline

\square

Isolate term with $k$ : First, we need to isolate the term containing $k$ on one side of the equation. To do this, we subtract $3$ from both sides of the equation to get rid of the constant term on the left side. $\newline$ $\frac{k}{4} + 3 - 3 = 14 - 3$
Simplify equation: After subtracting $3$ from both sides, we simplify the equation to find the term with $k$ . $\newline$ $\frac{k}{4} = 11$
Eliminate denominator: Now, to solve for $k$ , we need to eliminate the denominator $4$ . We do this by multiplying both sides of the equation by $4$ . $4 \times \left(\frac{k}{4}\right) = 11 \times 4$
Solve for $k$ : Multiplying both sides by $4$ , we simplify the left side by canceling out the $4$ in the numerator and the denominator, and on the right side, we perform the multiplication. $k = 44$

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