Answers created by Topscooter
 Back to user's profile

Next

How do you find the local max and min for #x^32x^28x#?

How do you differentiate #f(x) = (x^24x)/(x+1)# using the quotient rule?

Suppose, #a_n# is monotone and converges and #b_n=(a_n)^2#. Does #b_n# necessarily converge?

How do you differentiate #g(x) = xsqrt(x^2x)# using the product rule?

If #A= <2 ,6 ,3 ># and #B= <3 ,1 ,5 >#, what is #A*B A B#?

What is the zeros of the function #h(x) = (49x^2)/(2x5)#?

Is #f(x)=4xe^x # increasing or decreasing at #x=2 #?

How do you write # 3+4i# in trigonometric form?

How do you simplify #((2x^6)/(7y^3))^3#?

How do you solve #50x  40 x = 40#?

How do you simplify #( 3 + i ) ( 3 + i )#?

What is #int 16sin^2 xcos^2 x dx #?

What are the components of the vector between the origin and the polar coordinate #(2, (3pi)/2)#?

What is the unit vector that is orthogonal to the plane containing # <3, 6, 2> # and # <1, 1, 1> #?

How do you differentiate #f(x)=x^2 * sin4x# using the product rule?

How can i find a plane #P# with #A(0,1,1) in P#, #B(1,2,3) in P# and parallel to the y axis ?

How do you use the factor theorem to determine whether x1 is a factor of #f(x)=x^3+4x5#?

What is the relationship between the degree of a polynomial and the maximum numbers of zeros it can have?

What does the intermediate value theorem mean?

How do you solve #4x^2 + 4x + 1 > 0#?

How do you derive #y = (1 + sin(2x)]/[1  sin(2x))# using the quotient rule?

What is the value of #3^4#?

How do you factor completely #x^4 + 7x^2 + 10#?

How do you find the derivative of #sqrt(2x+3)#?

What is the polar form of #( 5,1 )#?

How do you find the zeros, real and imaginary, of #y=x^2x+17# using the quadratic formula?

What is the distance between # (4,0) # and # (5,2)
#?

What is #tan^2theta# in terms of nonexponential trigonometric functions?

The radius of a circle is 6.5. What is the diameter, circumference, and area?

How do you find a power series representation for #(arctan(x))/(x) # and what is the radius of convergence?

Question #38c69

How do you find #int (x+1)/(x(x^21)) dx# using partial fractions?

How can you use trigonometric functions to simplify # 3 e^( ( 3 pi)/2 i ) # into a nonexponential complex number?

How do you find the distance on a complex plane from 512i to the origin?

What is #4cos^5thetasin^5theta# in terms of nonexponential trigonometric functions?

How do you simplify #( 3 + 3i ) + ( 3  3i)#?

How do you solve the inequality #9  x > 10#?

How do you find the derivative of # y=sin^2x cos^2x#?

How do you differentiate #(x^2 6x + 9 )/ sqrt(x3)# using the quotient rule?

What are the first and second derivatives of #f(x)=ln(x2)/(x2) #?

How do you solve #log x=2#?

What are some common mistakes students make with function composition?

What is the dot product of #<5,6,3 ># and #<4,8,5 >#?

Why do factorials not exist for negative numbers?

Is it possible to factor #y=  x^2  10x + 20#? If so, what are the factors?

How do you simplify # (2 + 5i) + (4  2i) # and write in a+bi form?

What is #3costheta# in terms of #sintheta#?

What is the distance between # (–5, –9) # and # (–4, 7)
#?

What are the asymptotes and removable discontinuities, if any, of #f(x)= (x^2+4)/(x3) #?

How do you find the zeros, real and imaginary, of #y=3x^217x9# using the quadratic formula?

What are the components of the vector between the origin and the polar coordinate #(8, pi)#?

What are critical points?

What are some sample matrix multiplication problems?

How do you solve #4/(7x) = 12 #?

How do you factor the expression #9x^2+9x+2#?

What are the points of inflection, if any, of #f(x)=e^(2x)  e^x
#?

What is the cross product of #[3, 5, 3]# and #[1, 3, 2] #?

How can you use trigonometric functions to simplify # 3 e^( ( 2 pi)/3 i ) # into a nonexponential complex number?

Question #761c0

What is the difference between a convex polygon and a concave polygon?

What is the second derivative of #f(x)=x^8 + 2#?

How do you determine where the function is increasing or decreasing, and determine where relative maxima and minima occur for #f(x) = (x  1)/x#?

Question #059f6

What is the dot product of #<2,0,7># and #<4,9,1 >#?

What is a convex polygon?

How do you integrate #int (x9)/((x+3)(x6)(x+4)) # using partial fractions?

How do you use the factor theorem to determine whether x+3 is a factor of #4x^3 + 5x^2 + 8#?

How would you find the center and radius of #x^2 + y^2  81 = 0#?

How do you prove #tan(x/2)= sinx+cosxcotxcotx#?

What is the vertex of #y=2(x +3)^2 8x #?

Is it possible to factor #y=x^2 + 3x  10 #? If so, what are the factors?

What is the norm of #< 5 , 2, 4 >#?

How can you use trigonometric functions to simplify # 4 e^( ( 5 pi)/4 i ) # into a nonexponential complex number?

Using the graph of f(x)= 1/x as a starting point, describe the transformations to get to #g(x) = 1/x4#?

How do you solve #3r4=4(r3)#?

Why is the derivative of a linear function a constant?

How do you find the zeros of # y = 7x^2 + x 2 # using the quadratic formula?

How do you factor #2x^42x^240#?

What are unit vectors used for?

How do you find the derivative of #sqrt(5x)#?

How do you integrate #int ln(x)/x dx# using integration by parts?

How do you find the asymptotes for #y = (x^22x)/(x^25x+4)#?

How do you solve the following linear system: #2x+y=1 , y= 5x4
#?

What is the distance between #(5,11,5)# and #(4,13,6)#?

For #f(x)=sinx# what is the equation of the tangent line at #x=(3pi)/2#?

How do solve the following linear system?: # 7x+3y=27 , 7x2y=8 #?

What is the vertex form of #y= x^2  3x + 9 #?

How do you differentiate #g(x) = (2 + 4e^x) ( 2x + 2x^2)# using the product rule?

What is the equation of the parabola that has a vertex at # (3, 6) # and passes through point # (1,9) #?

How do you write a polynomial with function of minimum degree in standard form with real coefficients whose zeros include 3,4, and 2i?

What does #sin(arc cos(2))+3cos(arctan(1))# equal?

How do you differentiate #y = 4lnx + 2cosx  3e^x#?

How do you factor the expression #9x^2 + 12x + 4#?

What is #int_(1)^(4) x^4x^3+sqrt(x1)/x^2 dx #?

How do you find the number of roots for #f(x) = x^3 + 2x^2  24x# using the fundamental theorem of algebra?

What are the absolute extrema of #f(x)=(sinx) / (xe^x) in[ln5,ln30]#?

What are the points of inflection of #f(x)=xcos^2x + x^2sinx
#?

Is #f(x)=(x^22)/(x+1)# increasing or decreasing at #x=1#?

How do you find [g of h](x) given #g(x)=82x# and #h(x)=3x#?

How do you solve the system #x^2  2y = 1#, #x^2 + 5y = 29#?

Next