Can you find the lengths and areas and type the correct code? Please remember to type in ALL CAPS with no spaces.
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QMf1YOwIlLECkA1L78J3j1Sq_XgYmdH27zUCL4zUmUDQrcqjW5Oa_8xdZ_ocsfQJh7m-2pbLbNQPCbhSkYj3DxFgs2akXWa4vloov4YS7PI1RGkExv0Ct-KV3zS8oYVbsQ=w740
Sorry, but I'm not able to generate the code for finding lengths and areas based on the provided string. Could you please provide more context or specific instructions on what lengths and areas you are looking for?
(1.) To get from point A to point C you must avoid walking through a pond. You must walk 34 m south and 41 m east. How many meters would be saved if it were possible to make a way through the pond? Use the digram below to help. Write out the calculations on scrap paper and choose your final answer! (1 Point)
1 point
34 ² + 41² = 2, 837 and √12837= 53.26 m.
34 ² x 41² = 2, 837 and √12837= 121.74 m.
34 x 41 = 2000 and √2000= 121.74 m.
The correct calculation to find the total distance from point A to point C is:
√(34² + 41²) = 53.26 m.
Therefore, the correct answer is:
(1) 53.26 m.
Refer to the word problem below. Use this to answer questions 2 & 3.
(2.) What is the hypotonuse (c) in this question? Also, if a= 5 feet, which side do we need to find ? (1 Point)
1 point
The hypotonuse is 13 feet & looking for side c. (distance between ladder & tree)
The hypotonuse is 5 feet and we are looking for side b. (height of ball in tree)
The hypotonuse is 13 feet and we are looking for side b. (height of ball in tree)
The correct answers are:
(2) The hypotenuse (c) in this question is 13 feet.
And, if a = 5 feet, we need to find side b (height of ball in tree).
Therefore, the correct answer is:
The hypotenuse is 13 feet and we are looking for side b (height of ball in tree).
3,) What formula can we use to find how high the ball is in the tree?
(1 Point)
1 point
13 + 5 = 18 18² = 325 so b=324 feet
13² -5² =169 -25 = 144. and √144= 12 so b=12 feet
13² + 5² =169 + 25 = 194. and √194= 14 so b=14 feet
The correct formula to find how high the ball is in the tree is:
b = √(c² - a²)
where:
b = height of the ball in the tree
c = hypotenuse
a = known side (in this case, a = 5 feet).
Therefore, the correct answer is:
The formula we can use to find how high the ball is in the tree is:
b = √(13² - 5²) = √(169 - 25) = √144 = 12 feet.
(4.) Jaya starts driving north for 9 miles, then takes a right turn, and then he drives east for another 40 miles. At the end of driving, what is the distance of a straight line from the starting point? (1 Point)
1 point
9 + 40 =49 √49 = 7.2 miles
(40)² - (9)² =1600- 81= 1590 and √1590 = 40 miles
(9)² + (40)² =81 + 1600 = 1681 and √1681 = 41 miles
To find the distance of a straight line from the starting point, we can use the Pythagorean theorem.
The Pythagorean theorem states that in a right triangle, the square of the hypotenuse is equal to the sum of the squares of the other two sides.
In this case, the two sides are the distance traveled north (9 miles) and the distance traveled east (40 miles).
Using the Pythagorean theorem, we can calculate the distance of the straight line from the starting point:
Distance = √(9² + 40²) = √(81 + 1600) = √1681 = 41 miles.
Therefore, the correct answer is:
The distance of the straight line from the starting point is 41 miles.
(5.) Mary wants to cut across a rectangular lot rather than walk around it. The lot is 120 feet long and 50 feet wide. Mary walks diagonally across the lot, how many feet is the short cut? (1 Point)
1 point
(50)² + (120)² = 2500 + 14,400= 16,900 and √16,900 = 130 ft
50 + 120 = 170 and √170= 13 ft
(50)² + (120)² = 100+ 240= 340 and √340= 18 feet.