By spending almost ₹ 250 ,Rakhi bought some kg grapes(x) & some dozens of bananas(y), then as a constraint this information can be expressed by_______

Ganesh owns a godown used to store electronic gadgets like refrigerator(x) & microwave(y),If the godown can accommodate at most 75 gadgets, then this can be expressed as a constraint by ________________

One of the important application of the differential equation is to find out the family of curves for which some conditions involving the derivatives are given. For this one can proceed by making use of the following facts. Equation of the tangent at a point (x, y) to the curve y=f(x) is given by Y-y=dy/dx(X-x). At the X-axis, Y = 0, and X=x-y/(dy/dx) At the Y-axis, X = 0, and Y = y-dy/dx. Similar things, can be obtained for normals by writing its equation as (Y-y)dy/dx+X-x=0.If y = f(x) be a curve such questions length of x intercept of tangent is equal to the distance of the point of tangency from x-axis f(x) is given by

Sppose that a point mass 'm' is moving under a constant force vecF = 2hati-hatj + hatk netweon . At some instant , t=0, point P(xm, ym, -1m) [m- metre ] is the instantaneous position of the mass. We know that torque can be expressed as the cross- product of position vector and forces vector, i.e., tau= vecr xx vecF . At P, torque can be expessed as tau= (-4hatj - 4 hatk) Nm At some other instant, t=3 sec, the point mass has another instantaneous position Q(x_(1), y_(1), z_(1)) such that the displacement vectors between points P and Q and the given force are mutually perpendicular. Also, x-component of torqure at Q is zero and y z-components are equal in magnitude and direction along the negative direction of the respective axes. Using a definite scale, if we construct a parallelogram with the position vectors of Q and the gives force vecF as its adjacent sides , area of this parallelogram is 2sqrt(2)m^(2) . Area of the given parallelogram , in fact , represents a physical quantity whose magnitude in SI system can be expressed as 5 times the gives are Answer the following questions. At Q torque acting on the mass can be expressed as :

At infinite dilution, when the dissociation of electrolyte is complete, each ion makes a definite contribution towards the molar conductance of electrolyte, irrespective of the nature of the other ion with which it is associated. the molar conductance of an electrolyte at infinite dilution can be expressed as the sum of the contributions from its individual ions. A_(x)B_(y) rarr xA^(y+)+yB^(x-) Lambda_(m)^(@)(A_(x)B_(y))=xlambda_(A^(y+))^(@)+ylambda_(B^(x-))^(@) where, x and y are the number of cations and anions respectively. The degree of ionisation 'alpha' of weak electrolyte can be calculated as : alpha=Lambda_(m)/Lambda_(m)^(@) The molar conductance of 0.001 M acetic acid is 50 ohm^(-2) cm^(2) mol^(-1) . The maximum value of molar conductance of acetic acid is 250 ohm^(-1) cm^(2) mol^(-1) . What is the degree of dissociation (alpha) of acetic acid ?

Sppose that a point mass 'm' is moving under a constant force vecF = 2hati-hatj + hatk netweon . At some instant , t=0, point P(xm, ym, -1m) [m- metre ] is the instantaneous position of the mass. We know that torque can be expressed as the cross- product of position vector and forces vector, i.e., tau= vecr xx vecF . At P, torque can be expessed as tau= (-4hatj - 4 hatk) Nm At some other instant, t=3 sec, the point mass has another instantaneous position Q(x_(1), y_(1), z_(1)) such that the displacement vectors between points P and Q and the given force are mutually perpendicular. Also, x-component of torqure at Q is zero and y z-components are equal in magnitude and direction along the negative direction of the respective axes. Using a definite scale, if we construct a parallelogram with the position vectors of Q and the gives force vecF as its adjacent sides , area of this parallelogram is 2sqrt(2)m^(2) . Area of the given parallelogram , in fact , represents a physical quantity whose magnitude in SI system can be expressed as 5 times the gives are Answer the following questions. Work done the for the motion of the points mass from P to Q is :

Read the given table stating some features of molecules X and Y. Here, the X and Y can be identified as

TO reprsent word problem in the form of quadratic equations, suppose the unknown required quantity can be taken as some variable x (say) and express the given condition in the form of x to form an equaiton in x. Then wew express the equation in the descending powers of x. Thus standard quadratic equations is ax^(2) + bx + c = 0, a != 0 . Sandeep's father is 30 years older than him. The product of their ages 2 years from now will be 400. To find Sandeep's present age, the equation is

Whenever the terms on the two sides of the equation are of different nature, then equations are known as Non standard form, some of them are in the form of an ordinary equation but can not be solved by standard procedures. Now standard problems require high degree of logic, they also require the use of graphs, inverse properties of functions, inequalities. On the basis of above information, answer the following questions: The equation 2cos^(2)(x/2)=x^(2)+x^(-2), 0 lt x^(-2), 0 lt x le pi/2 has

Whenever the terms on the two sides of the equation are of different nature, then equations are known as Non standard form, some of them are in the form of an ordinary equation but can not be solved by standard procedures. Now standard problems require high degree of logic, they also require the use of graphs, inverse properties of functions, inequalities. On the basis of above information, answer the following questions: The number of real solutions of the equation sin(e^(x)) = 5^(x)+5^(-x) is