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Question

If the normal to the curve yx=0x2t2-15t+10dt at a point a,b is parallel to the line x+3y=-5 and it is also given that a>1, then the value of a+6b is equal to _______.


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Solution

Step 1: Calculate the slope of the curve

The given equation of the curve yx=0x2t2-15t+10dt.

Differentiate both sides of the equation with respect to x.

ddxyx=ddx0x2t2-15t+10dty'x=2x2-15x+10dxdx-202-150+10d0dxy'x=2x2-15x+10-0y'x=2x2-15x+10

Thus, the slope of the normal at a point a,b can be given by m1=-1y'a.

m1=-12a2-15a+10.

Step 2: Calculate the value of a

The normal is parallel to the line x+3y=-5.

y=-13x-53

Compare the given equation of the straight line with the slope-intercept form of a straight line, y=mx+c, where m is the slope.

Thus, the slope of the line is m2=-13.

As the lines are parallel, thus m1=m2.

-12a2-15a+10=-132a2-15a+10=32a2-15a+7=02a2-14a-a+7=02aa-7-1a-7=02a-1a-7=0a=12,7

It is given that, a>1.

So, a=7.

Step 3: Calculate the value of b

The given point a,b also lies on the curve yx=0x2t2-15t+10dt

Thus, ya=0a2t2-15t+10dt

b=072t2-15t+10dta=7b=2t33-15t22+10t107b=2733-15722+1071-2033+15022-1001b=6863-7352+70-0+0-0b=686×2-735×3+70×666b=-413

Therefore, a+6b=7-413.

a+6b=406.

Hence, the value of a+6b is 406.


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