How do you solve for k in $d + 3 = sqrt(2k – 5)$ ?

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How do you solve for k in $d + 3 = sqrt(2k – 5)$ ?

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Answer 1 · 2016-02-29T00:07:07

$k=(d^2+6d+14)/2$

Explanation:

$d+3=sqrt(2k-5)$

we can exchange the order off the factors:

$sqrt(2k-5)=d+3$

Now square both sides of the equation. sqrt(2k-5) is a positive number so we must add the constriction d+3>=0. Otherwise we would add a false solution:

$(sqrt(2k-5))^2=(d+3)^2 and d+3>=0$

$2k-5=d^2+6d+9 and d>= -3$

$2k=d^2+6d+14 and d>= -3$

$k=(d^2+6d+14)/2 and d>= -3$

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How do you solve for k in $d + 3 = sqrt(2k – 5)$ ?

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How do you solve for k in d + 3 = sqrt(2k – 5)d + 3 = sqrt(2k – 5)?

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How do you solve for k in $d + 3 = sqrt(2k – 5)$ ?