Use implicit differentiation to find the derivative at (1,2) 10x^4+y^4=26 slope=(-[?])/([ ])
Find the equation of the line parallel to y=-2x+1 that includes the point (4,1) Give your answer in Point-Slope Form. y-[?]=[ ](x-[ ]) Point-Slope Form: y-y_(1)=m(x-x_(1))
-vert -16vert div ((3^2-4))/(5-10)
Which is the simplified form of n^-6p^3 (n^6)/(p^3) (1)/(n^6)p^(3) (p^3)/(n^6) n^6p^3
Step 1: -10+8xlt 6x-4 Step 2: -10lt -2x-4 Step 3 : -6lt -2x Step 4: __ What is the final step in solving the inequality -2(5- 4x)lt 6x-4 xlt -3 xgt -3 xlt 3 xgt 3
Simplify the following expression by combining like terms: 3+v+4v^2+2-v^2+3v [?]v^2+[ ]v+[ ]
In gym , Manny's teacher recorded the amount of push ups the students did during class. Push-Ups 13,8,4,10,10,8,10 Find the mode of the data.
Find the function which has greater rate of change. y=3x-5 y=5x+2 2y=8x-4 3y=12x+15
Identify the y-intercept of f(x)=(x+2)(x+4) (0,8) (0,-6) (0,-2) (0,-4)
(-(8-11)^3-3vert -14vert )/(2^4)-7
5 Cheddar cheese costs $\$ 4.25$ per pound. Which equation best represents y, the total cost of x pounds of cheddar cheese? Your answer
Simplify. $\frac {\frac {9}{2}-6}{1+\frac {7}{6}}$ $\square $
Find the partial sum. $\{ 38,31,24,17,\ldots \} ;S_{12}$
7. Find the coordinates of the intersection of the diagonals of the parallelogram with vertices $(-2,-4),(-4,4),(2,12)$ and $(4,4)$ 8. Three vertices of $\square ABCD$ are $A(1,5),B(1,1)$ and $D(2,2)$ Find the coordinates of the remaining vertex.
The GCF of $40c^{6}$ and $48c^{7}$ is $8c$ The missing exponent is __ The solution is $\square $
Find the solution(s) to each equation, or explain why there is no solution. $\sqrt {x+4}+7=5$
28. \( \left(\frac{112}{7}\right)^{\frac{1}{4}} \)
use the distributive property to remove the parentheses. $(2z^{4}-8z^{3}+3)4z^{5}$ Simplify your answer as much as possible.
$Area=4\cdot 69$ $=\square \cdot (\square -\square )$
$2x+y=41$ $x=y-39$ $y=2x-41$ $y=-2x+41$ $x=2y+41$
