Perhaps you want this tan150=\frac{tan90+tan60}{1-tan90tan60} Divide by tan90 \frac{1+\frac{tan60}{tan90}}{\frac{1}{tan90}-tan60} Now \frac{1}{tan90}=cot90=0 Hence you get tan150=\frac{-1}{\sqrt3}

Apparently the elements of P are called regular open sets and the elements of Q are called regular closed sets . Interestingly, the lattices P and Q are Boolean with the function A^\bot:=X-A^- ...

Note that we have a geometric series. cc_1 =b\sin \theta c_1c_2 = cc_1 \sin \theta= b\sin^2 \theta c_2c_3 = c_1c_2 \sin \theta= b\sin^3 \theta Thus the total sum is S= b \sin \theta +b\sin^2 \theta + b\sin^3 \theta+... ...

(a) First distribute the dot product over addition as in p\cdot(q+r) = p\cdot q + p\cdot r and notice that p and r are perpendicular and so p\cdot r = 0. And so we are left with p\cdot q. ...

for the Point C(x;y) you have two conditions: (x+1)+y^2=(x-7)^2+(y-2)^2 and y=-4x+13 can you solve it now?

Your doubt is lecit: let us check what does it happen if we consider the case dT=kdt+kT-k\tilde{T}. A Physicist would probably start with the difference equation (let us put k=1 for simplicity) \Delta T(t)=\Delta t+T(t)-\tilde{T},~~(*) ...