The bridge connects two hills 100 feet apart. The arch on the bridge is in a parabolic form. The highest point on the bridge is 10 feet above the road at the middle of the bridge as seen in the figure.
Based on the information given above, answer the following questions:
The value of the integral `int_(-50)^(50)(x^(2))/250dx` is

The bridge connects two hills 100 feet apart. The arch on the bridge is in a parabolic form. The highest point on the bridge is 10 feet above the road at the middle of the bridge as seen in the figure. Based on the information given above, answer the following questions: The integrand of the integral int_(-50)^(50)x^(2)dx is ________ function.

The bridge connects two hills 100 feet apart. The arch on the bridge is in a parabolic form. The highest point on the bridge is 10 feet above the road at the middle of the bridge as seen in the figure. Based on the information given above, answer the following questions: The equation of the parabola designed on the bridge can be

The bridge connects two hills 100 feet apart. The arch on the bridge is in a parabolic form. The highest point on the bridge is 10 feet above the road at the middle of the bridge as seen in the figure. Based on the information given above, answer the following questions: The area formed by the curve x^(2)= 250 y , x-axis , y = 0 and y = 10 is

The bridge connects two hills 100 feet apart. The arch on the bridge is in a parabolic form. The highest point on the bridge is 10 feet above the road at the middle of the bridge as seen in the figure. Based on the information given above, answer the following questions: The area formed between x^(2)=250y , y-axis , y = 2 and y = 4 is

For the origin O, given two points A and B such that /_AOB=90^(@) on a parabola y=x^(2) .The line joining A and B has slope 2.On the basis of above information,answer the following questions: The area of Delta OAB is -

For the origin O given two points A and B such that /_AOB=90^(@) on a parabola y=x^(2) .The line joining A and B has slope 2. on the basis of above information answer the following questions: The equation of line AB is

Amit is planning to buy a house and the layout is given below. The design and the measurement has been made such that areas of two bedrooms and kitchen together is 95 sq.m. Based on the above information, answer the following questions: Find the cost of laying tiles in kitchen at the rate of Rs. 50 per sq.m

Manjit wants to donate a rectangular plot of land for a school in his village. When he was asked to give dimensions of the plot, he told that if its length is decreased by 50 m and breadth is increased by 50m, then its area will remain same, but if length is decreased by 10m and breadth is decreased by 20m, then its area will decrease by 5300m^(2) Based on the information given above, answer the following questions: The value of x (length of rectangular field) is

Manjit wants to donate a rectangular plot of land for a school in his village. When he was asked to give dimensions of the plot, he told that if its length is decreased by 50 m and breadth is increased by 50m, then its area will remain same, but if length is decreased by 10m and breadth is decreased by 20m, then its area will decrease by 5300m^(2) Based on the information given above, answer the following questions: The value of y (breadth of rectangular field) is

For the origin O , given two points A and B such that /_AOB=90^(@) on a parabola y=x^(2) . The line joining A and B has slope 2. On the basis of above information, answer the following question: The equation of line AB is