How do you simplify $5 i \sqrt{- 54}$ $5i sqrt(-54)$ ?

Question

How do you simplify $5 i \sqrt{- 54}$ $5i sqrt(-54)$ ?

3 Answers

Impact of this question

5267 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2017-09-27T19:49:33

$- 15 \sqrt{6}$ $-15sqrt6$

Explanation:

$5 i \times \sqrt{- 1} \times \sqrt{54}$ $5ixxsqrt(-1)xxsqrt(54)$

$5 i \times i \times \sqrt{54}$ $5ixxixxsqrt54$

$5 i^{2} \times \sqrt{54}$ $5i^2xxsqrt54$

$5 (- 1) \times \sqrt{54}$ $5(-1)xxsqrt54$

$- 5 \times \sqrt{54}$ $-5xxsqrt54$

$- 5 \times \sqrt{9} \sqrt{6}$ $-5xxsqrt9sqrt6$

$- 5 \times 3 \sqrt{6}$ $-5xx3sqrt6$

$- 15 \sqrt{6}$ $-15sqrt6$

Answer 2 · 2017-09-27T19:55:45

$- 15 \sqrt{6}$ $-15sqrt(6)$

Explanation:

$5 i \sqrt{- 54} \Rightarrow 5 i \sqrt{6 \times 9 \times - 1}$ $5isqrt(-54) => 5isqrt(6xx9xx-1)$

We can take out the root of 9:

$5 i \times 3 \sqrt{6 \times - 1} \Rightarrow 15 i \sqrt{6 \times - 1} \Rightarrow 15 i \sqrt{6} \sqrt{- 1}$ $5ixx3sqrt(6xx-1)=> 15isqrt(6xx-1)=> 15isqrt(6)sqrt(-1)$

$\sqrt{- 1} = i$ $sqrt(-1) = i$

So we have:

$15 i \times i \sqrt{6}$ $15ixxisqrt(6)$

$i \times i \Rightarrow i^{2} = - 1$ $ixxi => i^2= -1$

So this gives:

$- 15 \sqrt{6}$ $-15sqrt(6)$

Answer 3 · 2017-09-27T20:13:14

$5 i \sqrt{- 54} = - 15 \sqrt{6}$ $5isqrt(-54) = -15sqrt(6)$

Explanation:

Why another answer?

Because you should know that it is easy to make errors when it comes to square roots of negative (and complex) numbers.

The problem is that every non-zero number has two square roots, and the choice between them is a little arbitrary.

To see that there is a potential problem, consider the common "rule":

$\sqrt{a b} = \sqrt{a} \sqrt{b}$ $sqrt(ab) = sqrt(a)sqrt(b)$

then note that:

$1 = \sqrt{1} = \sqrt{- 1 \cdot - 1} \neq \sqrt{- 1} \cdot \sqrt{- 1} = - 1$ $1 = sqrt(1) = sqrt(-1 * -1) != sqrt(-1) * sqrt(-1) = -1$

Ouch! The "rule" breaks if $a < 0$ $a < 0$ and $b < 0$ $b < 0$ .

Let's tread a little more carefully...

We use the symbol $\sqrt{}$ $sqrt$ to denote the principal square root.

If $n > 0$ $n > 0$ then its principal square root is the positive one.

If $n < 0$ $n < 0$ then by convention, its principal square root is:

$\sqrt{n} = i \sqrt{- n}$ $sqrt(n) = i sqrt(-n)$

where $i$ $i$ is the imaginary unit, satisfying $i^{2} = - 1$ $i^2=-1$

With these conventions, we can safely state:

$\sqrt{a b} = \sqrt{a} \sqrt{b} if a \geq 0 or b \geq 0$ $sqrt(ab) = sqrt(a)sqrt(b)" if "a >= 0" or "b >= 0$

Then we find:

$5 i \sqrt{- 54} = 5 i^{2} \sqrt{54} = - 5 \sqrt{3^{2} \cdot 6} = - 5 \sqrt{3^{2}} \sqrt{6} = - 15 \sqrt{6}$ $5isqrt(-54) = 5i^2sqrt(54) = -5sqrt(3^2*6) = -5sqrt(3^2)sqrt(6) = -15sqrt(6)$

Science

Math

Humanities

... and beyond

How do you simplify $5 i \sqrt{- 54}$ $5i sqrt(-54)$ ?

3 Answers

Explanation:

Explanation:

Explanation:

Related questions

Impact of this question

Science

Math

Humanities

... and beyond

How do you simplify 5i√−545i sqrt(-54) ?

3 Answers

Explanation:

Explanation:

Explanation:

Related questions

Impact of this question

How do you simplify $5 i \sqrt{- 54}$ $5i sqrt(-54)$ ?