Find the area and perimeter of a rectangle with a base of 8in and a height of 5 in.

Question

(1 point)
Responses
￼
P = 40 in     and A =  26 in^2
P = 40 in     and A =  26 in^2
￼
P = 54 in     and A =  54 in^2
P = 54 in     and A =  54 in^2
￼
P = 26 in     and A =  40 in^2
P = 26 in     and A =  40 in^2
￼
P = 44 in     and A =  40 in^2

Bot GPT 3.5 · Answer

The correct answer is: P = 26 in and A = 40 in^2

I gotchu · Answer

If the perimeter of a square is 24 in, what is the area?(1 point) Responses ￼ A = 36 in^2 A = 36 in^2 ￼ A = 576 in^2 A = 576 in^2 ￼ A = 22 in^2 A = 22 in^2 ￼ A = 96 in^2 A = 96 in^2

Bot GPT 3.5 · Answer

The correct answer is: A = 36 in^2

I gotchu · Answer

HK¯¯¯¯¯¯¯¯¯ ¯ bisects ∠GKJ. ∡HKJ = 5x+4 ∠ . ∡ = 5 + 4 and ∡HKG = 9x−4 ∡ = 9 − 4 . Solve for x and the m<GKJ (1 point) Responses ￼ x = 5 m<GKJ = 32 degrees x = 5 m ￼ x = 2 m<GKJ = 28 degrees x = 2 m ￼ x = 5 m<GKJ = 14 degrees x = 5 m ￼ x = 2 m<GKJ = 32 degrees

I gotchu · Answer

<1 and < 2 are supplementary. If <1 = 2y + 9 and m<2 = 3y-4, what is the measure of <1?(1 point) Responses ￼ m<1 = 35 m<1 = 35 ￼ m<1 = 101 m<1 = 101 ￼ m<1 = 79 m<1 = 79 ￼ m<1 = 13 m<1 = 13

Bot GPT 3.5 · Answer

The correct answer is: m<1 = 79

I gotchu · Answer

Find the distance between points B(-2,14) and C (3,8). Round to the nearest tenth (1 point) Responses ￼ 30.5 30.5 ￼ 61.7 61.7 ￼ 5.2 5.2 ￼ 7.8 7.8

Bot GPT 3.5 · Answer

To find the distance between two points, you can use the distance formula: d = √[(x2 - x1)^2 + (y2 - y1)^2] Using the coordinates of points B(-2,14) and C(3,8), the distance would be: d = √[(3 - (-2))^2 + (8 - 14)^2] d = √[5^2 + (-6)^2] d = √[25 + 36] d = √61 Rounded to the nearest tenth, the distance is approximately 7.8. The correct answer is: 7.8

I gotchu · Answer

The midpoint of segment AB is (6, -3). The coordinates of one endpoint are A(-1, 8). Find the coordinates of endpoint B. ￼ (1 point) Responses ￼ (3, -1.5) (3, -1.5) ￼ (13, -14) (13, -14) ￼ (2.5, 5.5) (2.5, 5.5) ￼ (-8, 19) (-8, 19)

Bot GPT 3.5 · Answer

To find the coordinates of endpoint B, you can use the midpoint formula: (x1 + x2)/2 = 6 (y1 + y2)/2 = -3 Using the coordinates of endpoint A(-1, 8) and the midpoint (6, -3), you can set up the equations: (-1 + x2)/2 = 6 (8 + y2)/2 = -3 Solving these equations will give you the coordinates of endpoint B: -1 + x2 = 12 8 + y2 = -6 x2 = 12 + 1 x2 = 13 y2 = -6 - 8 y2 = -14 Therefore, the coordinates of endpoint B are (13, -14). The correct answer is: (13, -14)