Is it true that each number $2p>6, \ p \ is \ prime$ has a Goldbach partition which contains two twin primes?

Question

For instance,

$$2\cdot 5 = 10 = 7+3$$ $$2\cdot 7 = 14 = 3+11$$ $$2\cdot 11 = 22 = 5+17$$ $$2\cdot 13 = 26 = 7+19$$ $$2\cdot 17 = 34 = 3+31=5+29$$

So, Is it true that each number $2p>6, \ p \ is \ prime$ has a Goldbach partition which contains two twin primes ?