the benchmark
 👍
 👎
 👁

 👍
 👎
👤Writeacher 
 👍
 👎

 👍
 👎
Respond to this Question
Similar Questions

math  pls check my work!
help pls asap!!! Check my work! 1. Find the area for the following figure. (trapazoid: bottom base 16.3, top base 5.9, height 4.6) 51.06 m^2*** 74.98 m^2 27.14 m^2 102.12 m^2 2. Find the area for the following figure. (1 point)

calculus
let R be the region bounded by the xaxis, the graph of y=sqrt(x+1), and the line x=3. Find the area of the region R

calc
1. Let R be the region bounded by the xaxis, the graph of y=sqr(x) , and the line x=4 . a. Find the area of the region R. b. Find the value of h such that the vertical line x = h divides the region R into two regions of equal

geometry
The figure shown is a rectangle. the green shape in the figure is a square. The blue and white figures are rectangles, and the area of the blue rectangle is 24 square inches. a. write an expression for the area of the entire

Calculus
Let R be the region in the first quadrant under the graph of y=1/sqrt(x) for 4

Calculus
Sketch the region enclosed by the curves x= 49y^2 and x = y^2  49. Decide whether to integrate with respect to x or y. Then find the area of the region.

Calculus
The region R is bounded by the xaxis, x = 1, x = 3, and y = 1/x^3 A) Find the area of R B) B. Find the value of h, such that the vertical line x = h divides the region R into two Regions of equal area.

Calculus AB
Let R be the region bounded by the graphs of y=sin(pi x) and y=(x^3)4x, as shown in the figure above. (a) Find the area of R. (b) The horizontal line y=2, x=2, x=1. Write, but do not evaluate, an integral expression for the

calculus
Sketch the region enclosed by the curves x=64−y^2 and x=y^2−64. Decide whether to integrate with respect to x or y. Then find the area of the region. Area =

Calculus AB
y=6x y=x^2 Find the area of the region by integrating with respect to x. Find the area of the region by integrating with respect to y.  i got the intersection pts to be(3,9)and (2,4)....i then

Calculus II
Sketch the region enclosed by 2y=5x^(1/2), y=3, 2y+4x=9. Decide whether to integrate with respect to x or y, and then find the area of the region.

Math
The shape alongside is one quarter of a circle with radius 14 cm. find , i) the length of Arc.AB ii)the perimeter of the figure iii) the area of figure iv) the area of triangle AOB v) the area of the shaded segment
You can view more similar questions or ask a new question.