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In Classical Roots Lesson 9, the review answers typically cover vocabulary words and their meanings, as well as any related derivations or word forms. In Lesson 10, the review answers may focus on identifying word roots and prefixes/suffixes, and understanding how they contribute to the meaning of a word. It is important to thoroughly understand and memorize these review answers to strengthen vocabulary skills and comprehension of word origins.
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TaigaOh, isn't it wonderful to review and learn from our classical roots? Take your time going through each lesson, absorb the knowledge like a happy little sponge, and remember, there are no mistakes in learning, just happy accidents. Keep painting those beautiful word pictures with your newfound wisdom!
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What is the answer to 4x2 - 6x plus 1?
No answers in integers, quadratic formula gives roots as 1.31 and -0.19
The real fourth roots of -16?
there are no real answers to an even root (2,4,6,8) of any negative number. the innovation of i allows you to find the unreal answers. i= the fourth root of positive 16 is 2. so, the roots of -16 are positive and negative 2i. post script: you cannot have a real even root of a negative because a negative multiplied by a negative turns into a positive.
Why are there two integer answers for square roots but only one integer answer for cubed roots?
Well, isn't that just a happy little question? When we talk about square roots, we're looking for a number that, when multiplied by itself, gives us the original number. That's why there can be two integer answers, a positive and a negative. However, with cubed roots, we're looking for a number that, when multiplied by itself twice, gives us the original number. This usually results in just one integer answer, giving us a unique solution. Just remember, in the world of math, there's always room for different outcomes to create beautiful patterns!
What equals 252?
There are an infinity of possible answers: involving addition, sutraction, multiplication, division, powers, roots and a host of other mathematical operations. One of the simplest is 251 + 1
What does the discriminant tell you when solving quadratic equations for the roots?
Whether the equation has 2 distinct roots, repeated roots, or complex roots. If the determinant is smaller than 0 then it has complex roots. If the determinant is 0 then it has repeated roots. If the determinant is greater than 0 then it has two distinct roots.
