Simplify the following: square root {1 + (1 / {square root {15)^2} Write the expression in terms of i and simplify. {square root {-63 / {square root 7} Simplify (7 - square root of 2) / (1 + square root of 2) Simplify. 2 square root {45} - square root {20} ...
In the sum, something very different happens, if the roots are equal, they will only be added and obtained as coefficients, but the root will not be altered, neither it's radical nor its index. In this question a simplification of a square root will be made...
The numerator is the power we are raising the number to and the denominator is the root we are taking of the number. So which do we do first, raising the number to the power or taking the root of the number? We can actually do either first, but sometimes when...
When finding the square root of an expression that contains variables raised to an even power, remember that √x2=|x|x2=|x|. Examples: √9x2=3|x|9x2=3|x|, and √16x2y2=4|xy|16x2y2=4|xy|We will combine this with the square root of a product rule in our next example to...
Find the derivative of the given function using the power rule. y = square root 4 x + x^2 - sqaure root 3 x^2 - fraction 1 square root x Use the quotient rule to find the derivative of the following. y = \frac{3x^2 + 2}{x^2 + 1} ...
Answer and Explanation: We are given the expression 75x2y. Simplifying the given expression, we have: Solution: Taking the square root of each term, we...Become a member and unlock all Study Answers Start today. Try it now Create an account Ask a question Our experts can answer...
Evaluate the integral: integral of (5x^2 - 7x)/((x - 3)^2(2x + 3)) dx. Evaluate the integral. integral 1 / {x^2 - 4 x + 13} dx Evaluate the integral. integral {x - 1} / {x^2 + 2 x} dx. Evaluate the integral: Integral of [{x + 1}/{squareroot of {x - 2] ...
Answer to: Simplify the following: square root {15} / 4 . 2 / 3 - 1 / 4 . {square root 5} / 3 By signing up, you'll get thousands of step-by-step...
These types of polynomials show up often in the study of mathematics, and there are a plethora of special types of trinomials. One such type is a perfect square trinomial, and when we are familiar with what these look like, we can easily simplify trinomials that are perfect squares. Answer...