QUESTION IMAGE
Question
simplify the expression to a + bi form: $sqrt{36}-sqrt{-98}-sqrt{25}+sqrt{-128}$
Step1: Simplify square - roots of positive numbers
$\sqrt{36}=6$ and $\sqrt{25} = 5$.
Step2: Rewrite square - roots of negative numbers
$\sqrt{-98}=\sqrt{98}\times\sqrt{-1}=\sqrt{49\times2}\times i = 7\sqrt{2}i$ and $\sqrt{-128}=\sqrt{128}\times\sqrt{-1}=\sqrt{64\times2}\times i=8\sqrt{2}i$.
Step3: Substitute the simplified values into the original expression
$6 - 7\sqrt{2}i-5 + 8\sqrt{2}i$.
Step4: Combine like - terms
$(6 - 5)+(-7\sqrt{2}i + 8\sqrt{2}i)=1+\sqrt{2}i$.
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$1+\sqrt{2}i$