simplify the expression to ( a + bi ) form:
( -sqrt{4} + sqrt{-72} + sqrt{64} - sqrt{-98} )

Question

Accepted Answer

# Explanation:
## Step1: Simplify real square roots
$-\sqrt{4} = -2$, $\sqrt{64} = 8$
## Step2: Simplify imaginary square roots
$\sqrt{-72} = \sqrt{72}i = 6\sqrt{2}i$, $\sqrt{-98} = \sqrt{98}i = 7\sqrt{2}i$
## Step3: Combine real terms
$-2 + 8 = 6$
## Step4: Combine imaginary terms
$6\sqrt{2}i - 7\sqrt{2}i = -\sqrt{2}i$
## Step5: Combine real and imaginary parts
$6 + (-\sqrt{2}i)$

# Answer:
$6 - \sqrt{2}i$

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QUESTION IMAGE

Question

Explanation:

Step1: Simplify real square roots

Step2: Simplify imaginary square roots

Step3: Combine real terms

Step4: Combine imaginary terms

Step5: Combine real and imaginary parts

Answer: