Merty
This page lists questions and answers that were posted by visitors named Merty.
Questions
The following questions were asked by visitors named Merty.
Factor the following as if it were a trinomial. 25x^(3/2) + 10x^(3/4) + 1
10 years ago
Write the following in simplified form the 4th root of the 3rd root of a^12 b^36 c^14
10 years ago
Rationalize the denominator The square root of: (12x^5y^2z^3)/9x^3y^3z
10 years ago
Factor the follwoing as if this were a trinomial 4t^5/4 - 9
10 years ago
Find the following quotient. (4-7i)/(4+7i)
10 years ago
An object is thrown downward with an initial velocity of 4 feet per second. The relationship between the distance s it travels and time t is given by s = 4t + 16t2. How long does it take the object to fall 72 feet?
10 years ago
Solve the equation. Use factoring or the quadratic formula, whichever is appropriate. Try factoring first. If you have any difficulty factoring, then go right to the quadratic formula. (Enter your answers as a comma-separated list.) (x+2)^2 + (x-7)(x-2)=1...
10 years ago
Solve each equation using the quadratic formula. (Enter your answers as a comma-separated list.) x^2-2x+2=0
10 years ago
Find an equation that has the given solutions. (Assume the equation has a degree of 2.) a=-1/3, a=3/7
10 years ago
Find an equation that has the given solutions. (Assume the equation has a degree of 3.) x = −5, x = 5, x = 2/3
10 years ago
(x^4)-(4x^2)-45=0
10 years ago
(5(x+5)^2)+(2(x+5)^2)-7=0
10 years ago
2(9a-6)^2=11(9a-6)+63
10 years ago
x^4 - 29x^2 + 100 = 0
10 years ago
4x^2 - 3x + 3 = 0 Solve by completing the square
10 years ago
The following equation has three solutions. Look for the greatest common factor, then use the quadratic formula to find all solutions. 10t^5 + 5t^4 = 50t^3
10 years ago
x^4 + 6x^2 = -8 Solve the equation.
10 years ago
the square root of (x-11) = the square root of (x) - 1 The following equation will require that you square both sides twice before all the radicals are eliminated.
10 years ago
The following problem refers to an arithmetic sequence. If a_4 = 15 and a_10 = 39, find a_40 and S_40. The _ represents subscript
10 years ago
The following question is about specific geometric progression Find a_4 and S_4 for 100, −10, 1, . (Round your answer for S4 to three decimal places.) The _ represents subscript.
10 years ago
Answers
The following answers were posted by visitors named Merty.